tag:blogger.com,1999:blog-3239460757588184652024-03-22T15:35:27.853-07:00Escola Austríaca de Economia e Filosofia LibertáriaBlógui criado por Marcelo Werlang de Assis para divulgar a EAE e a FL.Unknownnoreply@blogger.comBlogger52125tag:blogger.com,1999:blog-323946075758818465.post-27485778059129624852024-03-22T13:45:00.000-07:002024-03-22T15:34:34.860-07:00Capítulos do livro Teoria da Moeda e do Crédito, de Ludwig von Mises<p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span color="windowtext" style="font-family: "Garamond",serif; mso-bidi-font-family: Arial;"></span></p><div class="separator" style="clear: both; text-align: center;"><span color="windowtext" style="font-family: "Garamond",serif; mso-bidi-font-family: Arial;"><img alt="" data-original-height="540" data-original-width="810" height="213" src="https://blogger.googleusercontent.com/img/a/AVvXsEiqhOey_GLzJhYpbHCCWwDCrc1PKu9aAM6Pg7o6sxcXCqgIY6WptqcGvI-kYUKkoVXC0YwjxpXbrlYWHbPV6nZKM6Z-r6aerk-BGOp1IyZJMgC1WEz6f7m_6hTFp_7nd0_f92H3JM00UdrZYQsKeh5-BZsLCxecOdR2XKbBSUxk98sWqIQvNcJlwhC7XdU" width="320" /></span></div><p></p><p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span color="windowtext" style="font-family: "Garamond",serif; mso-bidi-font-family: Arial;"><br /></span></p><p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span color="windowtext" style="font-family: "Garamond",serif; mso-bidi-font-family: Arial;">Nesta
postagem, no dia de hoje (22.03.2024), disponibilizo alguns arquivos já
traduzidos.</span><o:p></o:p></p><p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span color="windowtext" style="font-family: "Garamond",serif; mso-bidi-font-family: Arial;">Em
relação aos demais arquivos, ainda há muitas pendências. Postarei à medida que
eu os considerar prontos.<o:p></o:p></span></p><p class="MsoNormal" style="line-height: 115%; mso-layout-grid-align: none; text-align: justify; text-autospace: none;">
</p><p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span color="windowtext" style="font-family: "Garamond",serif; mso-bidi-font-family: Arial;">Boa
leitura!<o:p></o:p></span></p><p class="MsoNormal" style="line-height: 115%; mso-layout-grid-align: none; text-align: justify; text-autospace: none;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">Introdução de Doug French (<a href="https://drive.google.com/file/d/1Oa07a7p0RY7O8fZiBNaj5DxUFE4m7RcC/view?usp=sharing" target="_blank">aqui</a>)</span></b></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Introdução de Murray N. Rothbard (<a href="https://drive.google.com/file/d/1ZVHeD5YmzptcTJvxYSWi_j15a4s75tRe/view?usp=sharing" target="_blank">aqui</a>)<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Prefácio para a Nova Edição <o:p></o:p></span></span></b><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/17CiCNEyxHCVOt6K3vm2OUrj2j3pNMNfj/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Introdução do Professor Lionel Robbins <o:p></o:p></span></span></b><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1KmDx3FjjyFfgwzhTNfx5FsOgc59lCkNQ/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Prefácio para a Edição em Inglês (1934) <o:p></o:p></span></span></b><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1amo9tEj-_D-q2CxNgxnAkSTh2DeS8r5J/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Prefácio para a Segunda Edição em Alemão <o:p></o:p></span></span></b><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1cKPdnzO_GeriGcNrnH90_5I3vi93BezP/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Primeira Parte<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">A Natureza da Moeda<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 1<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">As Funções da Moeda <o:p></o:p></span></span></b><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1VcN4p516bQlGakxdMlPxwYVqdygjNs3e/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;"><span style="font-size: medium;">Capítulo 2<o:p></o:p></span></span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;">Sobre a Mensuração do
Valor </span></b><b><span style="font-family: Garamond, serif;"><o:p></o:p></span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1zTQqZEmhMtKszFzCidALW8uR5FUY44Ex/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="footnote" style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;"><span style="font-size: medium;">Capítulo 3<o:p></o:p></span></span></b></p>
<p class="footnote" style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;">Os Vários Tipos de
Moeda </span></b><b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;"><o:p></o:p></span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1LNzJLduyMLsnzBpimntRfHjLqyd3FBe9/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 4<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">A Moeda e o Estado </span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1c401-BYimtx72P_qA65PQPEvIlrrzJJV/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 5<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">A Moeda como Bem
Econômico </span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1m_nYF4tQLSeawbUzbZgW3TTCNV34JzHh/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 6<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Os Inimigos do Dinheiro <o:p></o:p></span></span></b><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1PveuafUdniz1txh7bAIrcDWcfy9BQGqS/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Segunda Parte<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">O Valor da Moeda</span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 7<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">O Conceito de Valor
da Moeda </span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1t-hkpsFnd47cMFoWEQVcugyu5goHHM1B/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 8<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">Os Determinantes do Valor de Troca Objetivo </span></b><span style="font-family: Garamond, serif; line-height: 115%;">—</span><b><span style="font-family: Garamond, serif; line-height: 115%;"> </span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">ou Poder de Compra </span></b><span style="font-family: Garamond, serif; line-height: 115%;">—</span><b><span style="font-family: Garamond, serif; line-height: 115%;"> </span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">da Moeda<o:p></o:p></span></b></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; line-height: 115%;">I. </span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">O Elemento de Continuidade no Valor de Troca Objetivo da Moeda </span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/18unjIHA9CUAhf-0-AMRCTKvBGoLwD0SF/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="footnote" style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: "Garamond",serif;">II. </span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;">Flutuações no Valor de Troca Objetivo da Moeda
Evocadas por Mudanças na Proporção entre a Oferta de Moeda e a Demanda por Ela</span></b><b><span style="font-family: "Garamond",serif;"><o:p></o:p></span></b></span></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: "Garamond",serif;">III. </span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;">Uma
Causa Especial de Variações no Valor de Troca Objetivo da Moeda Decorrente das
Peculiaridades da Troca Indireta</span></b><b><span style="font-family: "Garamond",serif;"><o:p></o:p></span></b></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 9<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">O Problema da Existência de Diferenças Locais no Valor de Troca Objetivo
da Moeda </span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1DkgpCRiowlWnh8XVgnZgzjcTTt56mxwz/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 10<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">A Proporção de Troca entre Moedas de Diferentes Tipos </span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"></span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><o:p></o:p></span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1lqDAuYsBc6vxQRUG-JZQLFvoTcSMr9cR/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 11<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">O Problema de Medir o Valor de Troca Objetivo da Moeda e as Variações
que nele Ocorrem </span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1t-QC_ChGx6JiRy-urluDGn4DH6ljJlYf/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;"><span style="font-size: medium;">Capítulo 12<o:p></o:p></span></span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;"><span style="font-size: medium;">As Consequências Sociais das Variações no Valor de
Troca Objetivo da Moeda<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 13<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">Política Monetária</span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 14<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">A Política Monetária do Estatismo <o:p></o:p></span></span></b><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1qufifISrkkHrrWj-JxSfL5MShGkTkH4z/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Terceira Parte <o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">Moeda e Atividade Bancária </span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-family: Garamond, serif; line-height: 115%;"><span style="font-size: medium;"> </span></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 15<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">Os Negócios da Atividade Bancária</span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"> <o:p></o:p></span></b></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 16<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">A Evolução dos Meios
Fiduciários</span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 17<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">Meios Fiduciários e a Demanda por Moeda</span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 18<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">O </span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">Resgate</span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"> dos Meios Fiduciários</span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 19<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">Moeda, Crédito e Juros</span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"> <o:p></o:p></span></b></span></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 20<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Problemas de Política Creditícia<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; line-height: 115%;">I. </span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">Observação Preliminar </span></b><b><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1nH4jJeq8tW6Uj007cFTpkzpWV6pEQiF_/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: "Garamond",serif;">II. </span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;">Problemas
de Política Creditícia antes da Guerra</span></b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; line-height: 115%;">III. </span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">Problemas de
Política Creditícia após a Guerra</span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><o:p></o:p></span></b></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Quarta Parte<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Reconstrução Monetária<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 21 <o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">O Princípio da Moeda Sólida <o:p></o:p></span></span></b><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1I91cSke04Q74Wn7y4hCBrp0eWcvg2ZSS/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;"><span style="font-size: medium;">Capítulo 22<o:p></o:p></span></span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;"><span style="font-size: medium;">Sistemas Monetários Contemporâneos <o:p></o:p></span></span></b><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1incqyaeeocoz1vdO5eX6hfdF7oFMK9RZ/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;"> </span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"><span style="font-size: medium;">Capítulo 23<o:p></o:p></span></span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">O Retorno à Moeda Sólida</span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"> </span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/177CQ57Hujtru3w-B6d7iFjaVNY3epbqO/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;">Observações Finais</span></b><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 115%;"> </span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1wUqMiWD-EEUfDOKYN1fFeMcrmk6Z8p6_/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;">Apêndice A: Sobre a Classificação das Teorias
Monetárias </span></b><b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;"><o:p></o:p></span></b></span><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1afGIPaL3_wZMNDus30COfM7fLhpqntIg/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;"><span style="font-size: medium;"> </span></span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;"><span style="font-size: medium;">Apêndice B: Nota do Tradutor do Alemão para o Inglês
sobre a Tradução de Determinados Termos Técnicos <o:p></o:p></span></span></b><b style="background-color: transparent; font-size: large;"><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal; line-height: 27.6px;">(<a href="https://drive.google.com/file/d/1mYrQLBR27tqJrsCr_p9XrurcvNDJLEK3/view?usp=sharing" target="_blank">aqui</a>)</span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;"><span style="font-size: medium;"> </span></span></b></p>
<p style="background: white; line-height: 115%; margin: 0cm; text-align: justify;"><span style="font-size: medium;"><b><span style="font-family: Garamond, serif; font-variant-alternates: normal; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal; font-variant-position: normal;">Índice Onomástico</span></b></span></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-69322688808418099722024-02-11T13:28:00.000-08:002024-02-11T13:28:03.001-08:00O que esperar da atuação do Sr. Rabier no estado argentino? (Marcelo Werlang de Assis)<p><span> </span><span> </span> </p><div class="separator" style="clear: both; text-align: center;"><img alt="" data-original-height="391" data-original-width="665" height="188" src="https://blogger.googleusercontent.com/img/a/AVvXsEjlOJbQC5iW25OZicg9-zYzJOKNIRDM1siYFLuXdsC09D3pO19HIWoyY5nbVQlSSlr0FZLoVo_IMryTNUBKpeCPzAxX7d1EmyazXmoxiDm12uB4iRCI6tdWpHyrMrs7CAUKVPMr5OMSy9LgP4m_oHQz9H6zdAvbxVdyPH63SuZ-ON-hhjkZdkkYltNgSDk" width="320" /></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;">Artigo meu publicado no <i>site </i>do Instituto Rothbard Brasil em 11.12.2023.</div><div class="separator" style="clear: both; text-align: center;">Clique <a href="https://drive.google.com/file/d/1EV1xJKyjpgUAwwP_MT_6WDxoSkkAVAYM/view?usp=sharing" target="_blank">aqui</a> para baixar o texto em formato PDF.</div><p></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-82674800554930839632023-11-30T08:45:00.000-08:002023-11-30T08:45:17.252-08:00Afinal, o que é este tal de anarcocapitalismo? (Jeffrey A. Tucker) <p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEiMbzP5jhR-RvBw7il7dxb16nrdBGkyXqGCwuoTgqrwVSWZSILHjbVc_L8xsYfwBinzfrmKTTOny960M1kutEW5h24D0BtcN9Y4D0b_UeXY0oD_etgTdXxitaj4FkWhll1WcGMUHwIH_TZ0QGYZCwqosv-7OV87zN2VB_WrO0XhJ_5qG8eoT9yCfVDxcwY" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="576" data-original-width="1024" height="225" src="https://blogger.googleusercontent.com/img/a/AVvXsEiMbzP5jhR-RvBw7il7dxb16nrdBGkyXqGCwuoTgqrwVSWZSILHjbVc_L8xsYfwBinzfrmKTTOny960M1kutEW5h24D0BtcN9Y4D0b_UeXY0oD_etgTdXxitaj4FkWhll1WcGMUHwIH_TZ0QGYZCwqosv-7OV87zN2VB_WrO0XhJ_5qG8eoT9yCfVDxcwY=w400-h225" width="400" /></a></div><br />Confira o texto <a href="https://rothbardbrasil.com/afinal-o-que-e-esse-tal-de-anarcocapitalismo/" target="_blank">aqui</a> (<i>site </i>do Instituto Rothbard Brasil). <p></p><p>Clique <a href="https://drive.google.com/file/d/1SPRd9iNe854cqRqSFUfSwXAZkm1E9qO3/view?usp=sharing" target="_blank">aqui</a> para baixar o texto em formato PDF.</p><p>***</p><p></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">A vitória presidencial de Javier Milei na Argentina
coloca na chefia de estado o primeiro autoproclamado “anarcocapitalista” da
história moderna </span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">—</span><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"> ou provavelmente a primeira
pessoa a sequer vencer uma eleição nesse nível a se identificar com o termo.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Nesse meio tempo, muitas pessoas me perguntaram
exatamente o que é isso. Então aqui está a explicação como eu a entendo.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Central para a ideia é que a sociedade não precisa
de uma entidade entrincheirada de compulsão e coerção legalizada/institucionalizada
chamada de estado para que desfrute da aplicação dos direitos de propriedade e dos
contratos, assim como da defesa e da sociedade comercial em geral. A fusão dos
termos anarquismo e capitalismo não configura um plano para a ordem social, mas
sim uma previsão daquilo que aconteceria numa comunidade civilizada na ausência
do estado.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><b><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Mito um:</span></b><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"> não é “de direita”, ao contrário do que dizem o <i>New
York Times</i>, o <i>Guardian</i> e mil outros veículos. A “direita” na Prússia
era pela unidade entre a Igreja, o estado e os negócios. A “direita” na França
era pelo direito divino da monarquia de governar. A “direita” nos Estados
Unidos se encontra em todos os lugares na história americana, mas dificilmente se
mostra coerente em prol da liberdade como um princípio primeiro da vida
sociopolítica. A noção de “anarcocapitalismo” está fora do binário esquerda/direita.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><b><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Mito dois:</span></b><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"> a parte “anarco” nada tem a ver com Antifa ou
caos. O uso do termo anarquismo, aqui, significa apenas a abolição do estado e a
substituição dele por relações de propriedade, por ação voluntária, por direito
privado e por execução de contratos conforme fornecida pela livre iniciativa.
Não significa ausência de lei, de normas; significa o direito como uma extensão
da volição humana e da evolução social em vez de uma imposição a partir de
cima. A ordem é a filha da liberdade, não a sua mãe, disse Proudhon; e os
anarcocapitalistas concordariam.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><b><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Mito três: </span></b><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">nem<b> </b>todo mundo que proclama ser “anarcocapitalista”
fala por essa escola de pensamento, nem de longe. A designação representa um
ideal amplo, com milhares de aplicações iterativas e uma enorme diversidade de
pontos de vista internos, como em qualquer outro campo ideológico. Estou ciente
de alguns que se colocaram a favor dos confinamentos COVID e da vacinação
compulsória, assim como de outros que continuam encontrando maneiras de
justificar guerras e esquemas de redistribuição em massa, por exemplo. Milei,
assim, não deve ser responsabilizado por cada coisa já dita ou escrita por um
adepto autodenominado.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">O termo tem origem na obra do economista americano
(e o meu amado mentor) Murray Rothbard, que foi fortemente influenciado no seu
libertarianismo pela romancista Ayn Rand na década de 1950. (Um dos cachorros domésticos
de Milei recebeu o nome de Murray.) Porém, à medida que Rothbard examinava de
perto a obra de Rand, ele passou a suscitar dúvidas sobre a instituição que
Rand insistia ser necessária e essencial </span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">—</span><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"> ou seja, o
próprio estado. Se devemos ter direitos de propriedade, por que só o estado possui
a permissão de violá-los? Se devemos ter autopropriedade, por que o estado é a
única instituição autorizada a esmagar e atropelar as pessoas por meio do
alistamento militar (conscrição), da segregação e de outras formas? Se buscamos
a paz, por que queremos um estado para incitar a guerra? E assim por diante.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Na visão de Rothbard, uma coerente regra na
sociedade que proíba a agressão contra pessoas e bens teria de se aplicar
também ao próprio estado </span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">—</span><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"> o qual tem
sido, historicamente, o violador de direitos humanos mais socialmente danoso
que existe. Toleramos que os estados defendam os nossos direitos apenas para depois
descobrir que o estado é a principal ameaça aos nossos direitos. Essa forma de
pensar também observa que ninguém jamais criou uma tecnologia ou um sistema que
tenha, com sucesso, mantido o estado em contenção após ele ter sido criado. (Muito
recomendado para uma compreensão mais profunda: o opúsculo “</span><span style="font-family: "Garamond",serif;">Anatomia do Estado</span><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">”, de Rothbard; <i>download</i> gratuito.)</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Muitos anarquistas da esquerda socialista fizeram
observações semelhantes, mas o rodopio intelectual de Rothbard foi de uma
previsão analítica sobre o que tomaria o lugar do estado na ausência dele.
Rothbard dizia que uma sociedade sem estado não seria uma comunidade governada
pela perfeita partilha de recursos e pela mesmice igualitária </span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">—</span><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"> muito menos por alguma elevação mágica para além
da natureza humana, como falavam os utopistas de esquerda. Em vez disso, essa
sociedade seria de propriedade, comércio, divisão do trabalho, investimento,
tribunais privados, mercados de ações, propriedade privada do capital e tudo o
mais. Em outras palavras: uma economia livre prosperaria mais que nunca sem o estado;
e veríamos uma liberdade ordenada conduzida ao seu mais alto nível possível de
realização.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Tenha em mente que levar adiante essa ideia colocou
Rothbard em conflito com praticamente todos, dos marxistas aos trotskistas,
passando pelos randianos, pelos conservadores e pelos liberais clássicos que
acreditavam que os estados sejam necessários para os tribunais, o direito e a
segurança. Isso inclusive o colocou em desacordo com outro dos seus mentores, o
próprio Ludwig von Mises, cuja única concepção de anarquismo provinha dos
círculos intelectuais europeus: eles, certamente, encontravam-se entre as
mentes menos responsáveis do continente.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">O anarquismo de Rothbard era americano até o âmago:
mais influenciado pelos tempos coloniais que pela Guerra Civil Espanhola. Ele
acreditava que as comunidades poderiam administrar a si próprias sem um senhor supremo
com o poder de tributar, inflar a moeda, recrutar e assassinar. Ele acreditava
que os mercados e a criatividade da cooperação humana pacífica sempre propiciariam
melhores resultados que instituições remendadas pelas elites e impostas pela
compulsão. Isso se aplica inclusive aos tribunais, à segurança e ao direito,
todos os quais ele acreditava serem mais bem fornecidos por meio das forças de
mercado dentro da estrutura das normas universais que regem a propriedade e a
ação humana.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Rothbard, nisso, estava revisitando um debate da
França do século XIX. Frédéric Bastiat (1801–1850) foi um grande economista e
liberal clássico que produziu alguns dos escritos mais convincentes da sua
geração em prol da liberdade </span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">—</span><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"> ou até mesmo
de todos os tempos. Mas ele sempre manteve na sua mente a crença na necessidade
de algum estado para fazer o sistema continuar funcionando de modo que a
sociedade não caísse no caos. Quem se opôs a Bastiat nessa questão foi o
intelectual menos conhecido Gustave de Molinari (1819–1912), que escreveu que
todas as funções necessárias para as operações sociais sob a liberdade podem
ser fornecidas através das forças do mercado. De muitas maneiras, Molinari foi
o primeiro “anarcocapitalista” verdadeiro, embora nunca tenha usado esse termo.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Certamente, teorias de alto nível originadas nos
salões de Paris durante a Belle Époque ou nos círculos intelectuais de Nova
York na década de 1950 são uma coisa. Mas colocar tudo isso em prática é outra.
Aqui é onde o teste de Milei realmente está. Nesse ponto, a sua teoria é apenas
isso, talvez uma inspiração para dar coragem de convicção, mas dificilmente um
projeto. Ele enfrenta um enorme estado administrativo que está profundamente
entrincheirado, uma moeda colapsada, um sistema judicial corrompido, um parlamento
hostil, uma mídia inimiga, além de cem anos de passivos previdenciários
flagrantes.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Como um ser humano assume tudo isso? Nós realmente
não sabemos a resposta para essa pergunta. Nenhum líder de uma nação
democrática ocidental desenvolvida jamais tentou uma transformação em grande
escala de um <i>establishment</i> corrompido a esse ponto. Nem Reagan nem
Thatcher, por mais abrangentes que fossem as suas reformas, sequer cortaram o
orçamento em geral; muito menos aboliram de fato agências inteiras. Eram
reformadores dentro da estrutura. Milei está sendo solicitado a fazer algo
nunca feito antes, em meio a uma grave crise para a nação.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Você não precisa aceitar totalmente o
anarcocapitalismo para apreciar o impulso e a esperança que se encontram aqui.
Em quem você confiaria mais para derrotar o estado </span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">— em</span><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"> alguém que acredita fortemente em algumas
características dele ou em alguém que se opõe à estrutura inteira, abrangendo
tanto a essência dela quanto as suas inúmeras ramificações? Isto é claro: essa
orientação ideológica irá infundir em qualquer estadista uma oposição ardente a
toda corrupção, a toda compulsão, a toda extorsão, a todo golpe promovido pela
elite administrativa. A diretriz anarcocapitalista, pelo menos, fornece uma luz
orientadora que poderia culminar em mais liberdade para todos.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">São impensáveis as forças internas e externas
aliadas contra o seu sucesso. E ele, Milei, está correndo contra o relógio. Em
um ano, toda a mídia da elite estará gritando que o “anarcocapitalismo” na
Argentina fracassou. Prometo. É nesse nível de absurdo que as coisas chegaram.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Digamos que Milei seja redirecionado pelos
globalistas neoliberais e busque reformas que apenas acompanhem a cartilha
neoliberal do final do século XX e depois de 2008. Isso pode ser atribuído ao
anarcocapitalismo? Com certeza, não.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">O anarcocapitalismo não está dando liberdade às
maiores corporações sob controle oligárquico para saquear e lucrar às custas do
povo. Não significa “privatizar” funções do estado que não deveriam existir em
primeiro lugar. Não significa vender recursos do estado para comparsas e
bandidos. Não significa conceder contratos de péssimos serviços públicos ao
maior licitante. Não significa permitir que as empresas de tecnologia se tornem
parceiras do estado na vigilância e no controle dos cidadãos. Tudo isso são
corrupções de uma ideia mais pura de capitalismo. E o anarcocapitalismo certamente
não está cumprindo os ditames do Fundo Monetário Internacional (FMI), do Banco
Mundial, do Fórum Econômico Mundial (FEM), muito menos do Departamento de Estado
dos EUA.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Existem todas as razões para ficar animado com a
vitória de Milei </span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">—</span><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"> quando muito, apenas porque ela
está mostrando que há uma demanda populista por reformas radicais e que isso
pode, de fato, ganhar eleições. Esperemos que os candidatos do Partido
Republicano nos Estados Unidos estejam assistindo e ouvindo. Eles parecem ter retrocedido
a discursos enlatados e respostas roteirizadas, que só entediam e aborrecem um
público que está farto do <i>status</i> <i>quo</i> e pronto para alguém com a
visão e a energia de um Milei se sobressair.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Milei pode ser apenas um dos muitos mais que virão.
Ele pode fracassar. Mas não mais pode ser duvidada a necessidade desesperada por
reformas e revoluções fundamentais e profundas em todas as democracias
industrializadas para recolocar o povo no comando. Aliás, se, depois de um
esforço valente, Milei fracassar, pelo menos teremos tido, conforme disse
Rothbard certa vez, um “feriado glorioso”, mas temporário, do <i>status</i> <i>quo</i>
político e administrativo com que lidamos todos os dias.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: windowtext; font-family: "Garamond",serif; letter-spacing: .35pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Existem todas as razões para acreditar que Milei seja
apenas o começo de uma nova tendência que pode se espalhar pelo mundo inteiro.
As pessoas estão enfastiadas e prontas para uma nova direção radical. Algo tem
de ser feito para sustar a marcha implacável das forças da tirania nas nações
ocidentais.</span><span style="color: windowtext; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p></o:p></span></p><br /><p></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-59187814843217112712023-11-27T11:07:00.000-08:002023-11-30T08:46:06.813-08:00Capitalismo, Socialismo e a Armadilha Neoclássica (Javier Gerardo Milei)<p></p><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEghRcZLhTO8XDriefIQnLdNhApahRBssALjfg1muqu_H6uXu1iA3dlYh5pp5PJrnpWl5clkLwTXX_c6sE2xJ9PtF12VsKIUeHxoSWLDIeWx6Pmv03Hibyf0U2rWyg_SLZNsqsbKSx0wqhNfL-gwA6DwaH_54_H23W0mJYfZ8oTrizQ1AtwoUVSxQ5Qw22w" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="576" data-original-width="1024" height="225" src="https://blogger.googleusercontent.com/img/a/AVvXsEghRcZLhTO8XDriefIQnLdNhApahRBssALjfg1muqu_H6uXu1iA3dlYh5pp5PJrnpWl5clkLwTXX_c6sE2xJ9PtF12VsKIUeHxoSWLDIeWx6Pmv03Hibyf0U2rWyg_SLZNsqsbKSx0wqhNfL-gwA6DwaH_54_H23W0mJYfZ8oTrizQ1AtwoUVSxQ5Qw22w=w400-h225" width="400" /></a></div><br /><br /></div></div></div></div><p>Confira o texto <a href="https://rothbardbrasil.com/capitalismo-socialismo-e-a-armadilha-neoclassica/" target="_blank">aqui</a> (<i>site</i> do Instituto Rothbard Brasil).</p><p><a href="https://drive.google.com/file/d/1SqyH1paLwXidHKtjbcD5PfVa3zPw1GrE/view?usp=sharing" target="_blank">Aqui</a>, o artigo em formato PDF.</p><p>***</p><p></p><p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">[Trata-se de um capítulo escrito por J. G. Milei publicado
na obra </span><span lang="EN"><a href="https://www.amazon.com/Emergence-Tradition-Philosophy-Political-Economy/dp/3031174178/ref=sr_1_1?crid=24XEJL3B1LXBA&keywords=in+honor+of+jesus+huerta+de+soto+howden+bagus&qid=1700513910&s=books&sprefix=in+honor+of+jesus+huerta+de+soto+howden+bagus%2Cstripbooks%2C105&sr=1-1&ufe=app_do%3Aamzn1.fos.17d9e15d-4e43-4581-b373-0e5c1a776d5d"><i><span lang="PT-BR" style="color: red; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; text-decoration: none; text-underline: none;">The
Emergence of a Tradition: Essays in Honor of Jesús Huerta de Soto, Volume II:
Philosophy and Political Economy</span></i></a></span><span class="a-size-extra-large"><span style="color: #0f1111; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial;">, editada por David Howden e
Philipp Bagus.</span></span><span style="background: white; color: #202124; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial;">]</span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Ainda não tive a oportunidade de conhecer pessoalmente
o professor Jesús Huerta de Soto. Eu, no entanto, já me sinto parte da legião
que o reconhece como um dos grandes gladiadores que defendem as ideias da
liberdade. Soube dele através de um ato de ordem espontânea. Eu, pouco antes, tinha
acabado de publicar com alguns colegas um livro no qual apresentávamos
propostas de política econômica que poderiam evitar o colapso do sistema
argentino; e eu estava apresentando o livro num programa de rádio quando um
ouvinte enviou alguns vídeos para mim. Tratava-se de gravações de uma aula na
qual o professor discorria sobre a maneira como os preços poderiam ser usados na
condição de mecanismo de transmissão de informações e para a coordenação e o ajuste
econômico, o que, por sua vez, tornava evidente como o socialismo era impraticável
</span><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> pois, na ausência de
propriedade privada, os preços não podem ser praticados, promovendo-se, assim,
o caos total. Eu imediatamente me tornei seguidor seu. Anos depois, a instituição
Unión Editorial publicou o meu livro </span><a name="Soto_78"></a><a name="ideas_127"></a><a name="information_45"></a><a name="private_property_19"></a><span class="00Text"><span style="color: red; font-family: "Garamond",serif; font-style: normal; mso-ansi-language: PT-BR;"><a href="https://www.unioneditorial.net/libro/vol-33-desenmascarando-la-mentira-keynesiana-keynes-friedman-y-el-triunfo-de-la-escuela-austriaca/"><i><span style="color: red; text-decoration: none; text-underline: none;">Desenmascarando la
Mentira Keynesiana</span></i></a></span></span><span class="00Text"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> </span></span><span class="00Text"><span style="color: black; font-family: "Garamond",serif; font-style: normal; mso-ansi-language: PT-BR; mso-themecolor: text1;">(“Desmascarando a Mentira
Keynesiana”)</span></span><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">, que foi aceito pelo próprio
Huerta de Soto para publicação dentro da seção que ele dirige. E as coisas boas
não terminariam por aí. Num dia, o professor Bagus me convidou para dar uma
palestra no programa de videoconferência Zoom como parte do curso dele. Eu
estava falando sobre o meu envolvimento com a política quando, de repente,
percebi alguma turbulência na reunião do Zoom. Fiquei surpreso ao ver o
professor Jesús Huerta de Soto, que se juntou à reunião para me cumprimentar e
me parabenizar pelo combate que estou travando na Argentina para fazer com que mais
de cem anos de socialismo sejam deixados para trás. Eu, até hoje, luto para
encontrar as palavras para descrever o quanto fiquei feliz pelo seu gesto,
assim como o quanto sou grato por tudo que aprendi com o professor Jesús Huerta
de Soto.<a name="Soto_79"></a><a name="Soto_80"></a><a name="Soto_81"></a><o:p></o:p></span></p>
<p class="Para12" style="line-height: 115%; text-align: justify;"><span class="04Text"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p> </o:p></span></span></p>
<p class="Para12" style="line-height: 115%; text-align: justify;"><span class="04Text"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><b>Palavras-chave:</b><o:p></o:p></span></span></p>
<p class="Para12" style="line-height: 115%; text-align: justify;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Socialismo <i>versus</i> Capitalismo; Abordagem
neoclássica; Existência e natureza única do equilíbrio; Ótimo de Pareto <i>versus</i>
Crescimento econômico de Smith; Debate inválido; Avanço socialista.<a name="In_this_chapter__I_will_address"><o:p></o:p></a></span></p>
<p class="Para12" style="line-height: 115%; text-align: justify;"><span style="mso-bookmark: In_this_chapter__I_will_address;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p> </o:p></span></span></p>
<p class="Para12" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: In_this_chapter__I_will_address;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Neste
capítulo, irei examinar o confronto entre socialismo e liberalismo a partir da
perspectiva neoclássica. A minha tese central é que, mesmo quando podemos
encontrar neoclassicistas genuínos que se identificam como liberais, os estudos
acadêmicos disponíveis sob o paradigma neoclássico se configuram, em última
análise, funcionais ao socialismo.</span></span><a name="To_trace_out_when_and_where_the"></a><a name="between"></a><a name="liberalism_20"></a><span style="mso-bookmark: To_trace_out_when_and_where_the;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para12" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: To_trace_out_when_and_where_the;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Para
estabelecer quando e onde ocorreu o desvio neoclássico, precisamos voltar às
origens: Adam Smith (1776), especificamente a sua obra <span class="00Text"><i>An
Inquiry into the Nature and Causes of the Wealth of Nations</i> </span><span class="00Text"><span style="font-style: normal;">(“Uma Investigação sobre a
Natureza e as Causas da Riqueza das Nações”)</span></span>, assim como o modelo
de crescimento econômico implícito nos livros I, II e III dessa obra. Mais
adiante, revisarei o que considero a abordagem pessimista, posição que é derivada
essencialmente de uma refutação malthusiana do otimismo de Adam Smith (Malthus,
1798) proveniente da sua descrição da fábrica de alfinetes (retornos crescentes
de escala).</span></span><a name="Once_the_terms_of_the_debate_hav"></a><a name="economic_growth_2"></a><span style="mso-bookmark: Once_the_terms_of_the_debate_hav;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para12" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Once_the_terms_of_the_debate_hav;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Uma
vez estabelecidos os termos do debate, iremos analisar a matematização da
economia, o papel de Pareto e o confronto entre Mises e Lange acerca da
controvérsia sobre o socialismo, os pressupostos fundamentais da análise
neoclássica e o modo como as supostas falhas de mercado abriram a caixa de
Pandora da intervenção governamental, favorecendo, assim, o avanço do
socialismo.</span></span><span style="font-family: Garamond, serif;"> </span></p>
<p align="center" class="Para12" style="line-height: 115%; text-align: center;"><b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> <b>Smith, Malthus e
os Clássicos<a name="Adam_Smith__the_Pin_Factory__the"></a> </b></span><b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></b></p>
<p align="center" class="Para12" style="line-height: 115%; text-align: center;"><b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Adam Smith, a Fábrica de Alfinetes, a Mão Invisível e
o Crescimento Econômico</span></b></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: What_was_Adam_Smith_s_main_take;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Qual
foi a principal mensagem de Adam Smith? Adam Smith estava tentando explicar por
que os países são ricos e por que eles crescem. Nesse sentido, podemos
encontrar, na sua obra, cinco elementos que desempenham uma função importantíssima
na explicação do seu modelo de crescimento econômico: o primeiro é o papel da
poupança, que é usada para financiar o investimento e propiciar a acumulação de
capital. Essa acumulação de capital possibilita o aumento da eficiência e da
produtividade do trabalho, o que, por sua vez, eleva os salários reais e, dessa
forma, permite que as pessoas alcancem uma condição mais aprimorada de vida.
Além disso, para garantir que a poupança seja utilizada para investimentos da
melhor maneira possível, a intervenção governamental, que sempre atrapalha o
fluxo das atividades econômicas, deve ser minimizada. Na verdade, tudo que o
governo realmente faz é macular o direito de propriedade, distorcendo os sinais
de preços e os cálculos econômicos. É por esse motivo que o socialismo, na sua
essência, destrói os sinais de preços a ponto de impedir o cálculo econômico, provocando
a ruína da economia.</span></span><a name="Another_fundamental_element_anal"></a><a name="Smith"></a><a name="economic_calculations_1"></a><a name="economic_calculation_4"></a><span style="mso-bookmark: Another_fundamental_element_anal;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Another_fundamental_element_anal;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Outro
elemento fundamental analisado por Smith, apesar de ter escrito a sua obra
entre 1766 e 1776, é o papel dos trancos-e-barrancos na inovação tecnológica,
entrelaçado com a ideia de aprendizagem experiencial. Smith essencialmente sustentou
a ideia de que uma pessoa, ao realizar uma atividade, aprende com a experiência;
e a ideia de que, à medida que ela aprende, a sua produtividade aumenta. Ao
mesmo tempo, surgirá a noção subjacente de otimização, desencadeada pelo
incentivo para a produção do máximo possível de bens com a utilização da menor
quantidade possível de esforço. Em consequência, nessa busca por economia de
tempo e esforço durante o aprendizado experiencial, descobre-se um
aprimoramento tecnológico, manifestado como um salto na função de produção (ou
deslocamento ascendente), o que também chamamos de choque tecnológico, salto
tecnológico ou melhoria tecnológica. Ou seja, uma situação em que, com o mesmo
número de horas de trabalho, a produção é muito maior.</span></span><a name="This_last_description_is_aligned"></a><a name="idea_43"></a><a name="idea_44"></a><span style="mso-bookmark: This_last_description_is_aligned;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: This_last_description_is_aligned;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Essa
última descrição está alinhada com a moderna teoria do crescimento econômico
(endógeno). Trata-se daquilo que, em termos simples, encontra-se por trás da
parábola da fábrica de alfinetes </span></span><span style="mso-bookmark: This_last_description_is_aligned;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: This_last_description_is_aligned;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> ou, falando mais
tecnicamente, da presença de retornos crescentes de escala que propiciam o
crescimento de longo prazo da produção <i>per capita</i>. De fato, o modelo de
Solow-Swan (Solow, 1956), que se baseia no conceito neoclássico de função de
produção (retornos constantes de escala e retornos marginais decrescentes para
cada um dos fatores analisados isoladamente), é incapaz de mostrar uma taxa de
crescimento da produção <i>per capita</i> uma vez que tenha sido atingido o
equilíbrio de crescimento balanceado. Portanto, para evidenciar empiricamente
um crescimento econômico, esse modelo recorre a um truque matemático no qual o
progresso tecnológico se mostra exógeno.</span></span><a name="In_turn__Adam_Smith_not_only_int"></a><span style="mso-bookmark: In_turn__Adam_Smith_not_only_int;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: In_turn__Adam_Smith_not_only_int;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Adam
Smith, por sua vez, não apenas introduziu uma função de produção que poderia
explicar o que aconteceria nos quase 250 anos seguintes à sua obra, mas também dotou
o seu modelo de um processo de tomada de decisões, instrumentado na metáfora da
mão invisível. Sob esse conceito baseado na cooperação social, cada indivíduo,
guiado pelo seu próprio autointeresse, contribui na realidade para a
maximização do bem-estar geral </span></span><span style="mso-bookmark: In_turn__Adam_Smith_not_only_int;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: In_turn__Adam_Smith_not_only_int;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> ou seja, o modelo do
Pai da Economia baseia-se em duas ideias fundamentais: a fábrica de alfinetes
(retornos crescentes de escala) e o conceito da mão invisível (cooperação
social sob ordem espontânea).</span></span><a name="Furthermore__the_pin_factory_imp"></a><a name="ideas_128"></a><span style="mso-bookmark: Furthermore__the_pin_factory_imp;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Furthermore__the_pin_factory_imp;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Além
disso, a fábrica de alfinetes envolve também o foco nas habilidades e tarefas
exigidas naquela atividade. Adam Smith propõe destacar o que acontece quando o
trabalho é dividido (o que anda de mãos dadas com o processo de cooperação
social implicitado pelo processo de mercado) em diferentes atividades para realizar
um produto final. Smith, assim, emprega um exemplo para explicar que a divisão
do trabalho promove um aumento significativo na produtividade. Nesse contexto,
Smith nos convida a pensar nos resultados de uma pessoa que, em isolamento,
propõe-se a fazer alfinetes. Concentrando-se em todas as dezoito
especializações necessárias para produzir um alfinete, ela poderia
hipoteticamente fazer cerca de vinte alfinetes por dia. Porém, se o trabalho
com as suas respectivas especializações fosse dividido entre dez pessoas, a
produtividade aumentaria para mais de quatro mil alfinetes <i>per capita</i> </span></span><span style="mso-bookmark: Furthermore__the_pin_factory_imp;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: Furthermore__the_pin_factory_imp;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> isto é, a produtividade seria duzentas vezes maior.</span></span><a name="At_the_same_time__Adam_Smith_won"></a><span style="mso-bookmark: At_the_same_time__Adam_Smith_won;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: At_the_same_time__Adam_Smith_won;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Ao
mesmo tempo, Adam Smith se perguntava até onde esse processo de divisão do
trabalho poderia ir, cuja resposta era que o tamanho do mercado estabelece o
limite da divisão do trabalho, pois: quanta produtividade faria sentido gerar caso
fosse excedida a demanda do mercado? Se a produtividade exceder a demanda do
mercado por alfinetes, o seu preço acabará entrando em colapso, e recursos e
força produtiva serão desperdiçados numa direção não prioritária.</span></span><a name="In_short__what_Adam_Smith_introd"></a><span style="mso-bookmark: In_short__what_Adam_Smith_introd;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: In_short__what_Adam_Smith_introd;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Em resumo:
o que Adam Smith introduz é a questão dos retornos crescentes de escala, algo
que não configura um assunto menor se considerarmos que, a partir do ano 1800,
a população se multiplicou quase sete vezes até o ano 2000 (Maddison, 2007). Tenhamos
em mente que, com o bilhão de habitantes atingido em 1810, Malthus — autor ao
qual irei me referir mais adiante — argumentava que a densidade populacional
levaria o mundo a um colapso resultante de uma fome generalizada. Portanto, é
importante ressaltar o contraste, pois, em toda a realidade, o produto <i>per
capita</i> se multiplicou quase dez vezes (Maddison, 2007) num contexto de
população que se multiplicou por sete. Ou seja, os retornos crescentes são
expostos por um tremendo aumento de produtividade, o qual, computado hoje,
representaria um aumento de cem vezes.</span></span><a name="At_the_same_time__if_we_analyze"></a><span style="mso-bookmark: At_the_same_time__if_we_analyze;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: At_the_same_time__if_we_analyze;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Ao
mesmo tempo, se analisarmos o assunto em termos matemáticos, devemos considerar
que estamos falando de uma função com um formato convexo </span></span><span style="mso-bookmark: At_the_same_time__if_we_analyze;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: At_the_same_time__if_we_analyze;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> ou seja, uma função convexa, que não é o mesmo que um
conjunto convexo. Uma função convexa não é um conjunto convexo, pois, se dois
pontos são unidos, a linha resultante está fora do conjunto de possibilidades
produtivas. Numa função côncava, pelo contrário, se dois pontos são unidos, a
linha está dentro do conjunto de possibilidades produtivas </span></span><span style="mso-bookmark: At_the_same_time__if_we_analyze;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: At_the_same_time__if_we_analyze;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> e, portanto, estamos falando de um conjunto convexo
(Starr, 2011). E, embora não seja intenção minha me debruçar sobre terminologia
matemática, infelizmente todo o programa de pesquisa neoclássico baseado na
maximização restrita colocada num formato matematicamente inadequado nos
permite explicar o desvio neoclássico. Ademais, inclusive para os economistas
que são verdadeiros liberais no seu modo de pensar, o paradigma em questão os
empurra para “a presença de falhas de mercado” de forma a buscar “fundamentos
razoáveis para a intervenção governamental” (Laffont, 1988) </span></span><span style="mso-bookmark: At_the_same_time__if_we_analyze;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: At_the_same_time__if_we_analyze;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> o que, em última análise, coloca em movimento a atividade
de perfuração da crescente máquina de intervenção que Hayek tão claramente
imaginou no seu livro <a name="research_6"></a><a name="Hayek_36"></a><a name="book"></a><span class="00Text"><i>The Road to Serfdom</i></span> (Hayek, 1944) (“O
Caminho para a Servidão”).</span></span><a name="Furthermore__when_analyzing_the"></a><span style="mso-bookmark: Furthermore__when_analyzing_the;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Furthermore__when_analyzing_the;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Além
disso, ao examinar a formulação matemática da caixa-de-ferramentas neoclássica,
o conceito da fábrica de alfinetes (pilar metodológico para explicar o
crescimento endógeno) entra em conflito com a ideia da mão invisível, que é um
dos elementos mais maravilhosos apresentados na obra de Adam Smith. Wilfredo
Pareto, assim, iluminado pela força conceitual da brilhante metáfora que
afirmava que cada indivíduo, movido pelos seus próprios interesses </span></span><span style="mso-bookmark: Furthermore__when_analyzing_the;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: Furthermore__when_analyzing_the;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> e inclusive de maneira não intencional </span></span><span style="mso-bookmark: Furthermore__when_analyzing_the;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: Furthermore__when_analyzing_the;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">, contribui para a maximização do bem-estar geral,
iluminado também pela sua bela contraparte matemática, foi levado a declarar “a
falência da fábrica de alfinetes”, arremetendo a análise econômica para o
caminho obscuro dos retornos marginais decrescentes.</span></span></p>
<p align="center" class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: center; text-indent: 0cm;"><b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Thomas Malthus,
Retornos Marginais Decrescentes e Pessimismo</span></b></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: So_then__the_optimism_promoted_b;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Assim,
o otimismo promovido por Adam Smith sofreu a oposição de uma brutal onda de
pessimismo, essencialmente iniciada por Thomas Malthus. O eixo central de
Malthus nessa discussão se baseava na ideia de retornos marginais decrescentes
em vez da consideração de uma função de produção com retornos crescentes de
escala; ou seja, agora a função de produção seria caracterizada por uma função
côncava (e, portanto, o conjunto de produção seria convexo).</span></span><a name="This_view_of_the_productive_syst"></a><a name="idea_46"></a><span style="mso-bookmark: This_view_of_the_productive_syst;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: This_view_of_the_productive_syst;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Essa
visão do sistema produtivo, aliada àquilo que Malthus chamou de “paixão entre
os sexos”, fez com que ele fosse levado a conclusões errôneas. Esse postulado
sustentava que, quando a população estava abaixo do “nível de equilíbrio”, isso
resultava num número mais significativo de recursos <i>per capita</i> (dada a
maior produtividade marginal do trabalho), o que induzia mais atividade sexual,
a qual fazia o tamanho da população aumentar. Isso prejudicava o mercado de
trabalho, uma vez que o aumento do número de trabalhadores desvalorizava o
salário real por meio da queda na produtividade marginal à medida que o
trabalho aumentava. Naturalmente, esse processo continuaria até que o salário
real caísse para o nível de subsistência. Reciprocamente, se a população aumentasse
acima do nível de equilíbrio, a menor produtividade marginal do trabalho
moveria os salários para abaixo do nível de subsistência, provocando a fome até
que a população diminuísse para o nível de equilíbrio.</span></span><a name="Ultimately__the_size_of_the_popu"></a><span style="mso-bookmark: Ultimately__the_size_of_the_popu;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Ultimately__the_size_of_the_popu;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Em
última análise, o tamanho da população estaria alinhado com o nível do valor da
produtividade marginal do trabalho (para uma função com retornos marginais
decrescentes) que equivalesse ao salário de subsistência </span></span><span style="mso-bookmark: Ultimately__the_size_of_the_popu;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: Ultimately__the_size_of_the_popu;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> o que recebeu o nome de <a name="value_12"></a><span class="00Text">Lei de Ferro dos Salários</span>. Finalmente, se ocorresse por
algum motivo um aprimoramento tecnológico, ele seria automaticamente absorvido
por um aumento da população, de modo que o salário real retornaria ao nível de
subsistência.</span></span><a name="At_the_time_of_Malthus_and_with"></a><span style="mso-bookmark: At_the_time_of_Malthus_and_with;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: At_the_time_of_Malthus_and_with;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Na
época de Malthus e com as informações históricas então disponíveis, a hipótese
não parecia ruim porque, entre os anos 0 e 1800 (da era cristã), o produto <i>per
capita</i> crescia a uma taxa de 0,02% ao ano; praticamente nada. Além disso, nesses
1800 anos, esse crescimento do produto <i>per capita</i> significou uma
elevação total de 40%, concentrado principalmente durante o século após o
descobrimento da América, como resultado do aumento do “comércio”
internacional.</span></span><a name="In_this_sense__if_you_asked_an_e"></a><a name="information_46"></a><span style="mso-bookmark: In_this_sense__if_you_asked_an_e;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: In_this_sense__if_you_asked_an_e;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Nesse
sentido, se você pedisse a um econometrista que estudasse os dados naquele
momento da história, ele teria rejeitado a hipótese de Adam Smith e concordado com
a possibilidade de que Thomas Malthus estivesse certo. Todavia, quando olhamos
para o que aconteceu depois, percebemos que nada poderia estar mais longe da
verdade. Malthus estava grosseiramente errado, e Smith estava certo. De fato, o
ressurgimento da teoria do crescimento econômico com o artigo de Paul Romer
(Romer, 1986) (pelo qual recebeu o Prêmio Nobel de Economia), resultado da sua
tese em Chicago orientada por Robert Lucas Jr. (um discípulo de Hirofumi Usawa,
criador do modelo de crescimento bisetorial [Usawa, 1961</span></span><span style="mso-bookmark: In_this_sense__if_you_asked_an_e;"><span style="background: white; color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-themecolor: text1;">]</span></span><span style="mso-bookmark: In_this_sense__if_you_asked_an_e;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> com
capital humano na década de 1960), não apenas retoma a obra de Adam Smith, mas
também os debates de Young e Marshall do início do século XX, que procuravam
explicar o crescimento econômico no nascente mundo neoclássico. Isso significa
que, no início do século XX e à luz dos dados disponíveis, a teoria dos
retornos crescentes era evidente, e aqueles que defendiam a existência de uma
função de produção com retornos marginais decrescentes eram deixados de fora da
discussão.</span></span></p>
<p align="center" class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: center; text-indent: 0cm;"><b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> <b>A Tradição Neoclássica e a Origem
do Erro<a name="General_Equilibrium__Pareto_Opti"></a> </b></span><b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></b></p>
<p align="center" class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: center; text-indent: 0cm;"><b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Equilíbrio Geral, Otimalidade
de Pareto e a Mão Invisível</span></b></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Now__after_reviewing_in_a_simpli;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Agora,
depois de rever de forma simplificada a controvérsia entre Smith e Malthus (e
todos os seus herdeiros até Solow-Swan), estamos prontos para abordar o motivo pelo
qual a tradição neoclássica acaba sendo funcional para o socialismo e se tornando,
de forma não intencional, cúmplice dos diferentes tipos de modelos keynesianos
na destruição da ordem de mercado, a qual não conduz a nada mais que a ordem
emergente da cooperação social.</span></span><a name="From_my_point_of_view__and_this"></a><span style="mso-bookmark: From_my_point_of_view__and_this;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: From_my_point_of_view__and_this;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Do
meu ponto de vista </span></span><span style="mso-bookmark: From_my_point_of_view__and_this;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: From_my_point_of_view__and_this;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> e trata-se do
argumento central nesta minha exposição </span></span><span style="mso-bookmark: From_my_point_of_view__and_this;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: From_my_point_of_view__and_this;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">, o desvio acontece quando, com a introdução da
matemática na economia juntamente com o conceito de otimalidade de Pareto, ocorre
uma tentativa de alinhá-la com a ideia da mão invisível. Inicialmente, “isso não
parece ser uma má ideia”; e na verdade não é uma má ideia para uma economia de
pura troca sem nenhuma produção. Assim, partindo de um dado ponto, o objetivo é
aprimorar as instâncias aprimoráveis para os indivíduos sem provocar pioras para
ninguém; e, quando essas possibilidades de aprimoramento são esgotadas,
exauridas, percebe-se que a otimalidade de Pareto foi atingida. Em outras
palavras, o objetivo é alcançar o máximo de bem-estar social (além da não
insignificante questão da instrumentação), no qual ninguém seria capaz de aprimorar
a sua situação sem afetar negativamente os outros. No entanto, o problema surge
com a sua maior força quando a ideia da otimalidade de Pareto numa economia com
produção é associada à ideia da mão invisível num contexto de otimização
matemática, conceitualmente mal projetada a partir da ligação do setor
produtivo com os indivíduos proprietários dessas empresas.</span></span><a name="Formally__on_the_consumers__side"></a><a name="idea_47"></a><a name="idea_48"></a><a name="idea_49"></a><a name="idea_50"></a><a name="idea_51"></a><span style="mso-bookmark: Formally__on_the_consumers__side;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Formally__on_the_consumers__side;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Formalmente,
do lado dos consumidores, podemos observar a função de utilidade, a qual
apresenta a forma de um sino; e, se você cortasse uma parte dele, seria capaz
de ver ali dentro o mapa de indiferença (as curvas de nível ou indiferença), o que
poderia tomar uma forma semelhante a uma banana ou a uma ferradura de acordo
com as suposições que você deseje fazer em relação aos níveis de satisfação, desde
que você tenha em mente a maximização da função (de tal modo que se permita
encontrar um máximo). Por sua vez, a demanda por bens e a oferta de fatores resultarão
desse sistema. Por outro lado, ao observar a empresa, aparecerá uma função de
produção, com retornos constantes de escala (isto é, lineares) ou com retornos
marginais decrescentes. Quando isso acontece, o lucro pode ser maximizado, e a
demanda por suprimentos e fatores é obtida, derivando a oferta de bens para
maximizar o lucro.</span></span><a name="Therefore__now_with_functions__c"></a><span style="mso-bookmark: Therefore__now_with_functions__c;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Therefore__now_with_functions__c;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Portanto,
agora com funções (correspondências) que são derivadas de estruturas
maximizadoras, tanto do lado dos consumidores quanto do lado dos produtores, as
funções emergentes de oferta e de demanda (correspondências) são ótimas. Por
sua vez, quando as funções de excesso de demanda (correspondências), que são o
resultado da demanda menos a oferta em cada um dos mercados, têm a
característica de serem funções contínuas (correspondências) (semicontínuo
superior), a soma/subtração de funções contínuas (semicontínuo superior) configura
uma função contínua (semicontínuo superior), de modo que é possível aplicar o <i>Teorema
do Ponto Fixo</i> de Brouwer (Kakutani para correspondências), por meio do qual
se comprova a existência de equilíbrio. Finalmente, se as funções apresentam
determinadas condições, funções estritamente côncavas em consumidores e
produtores, esse equilíbrio é único. Em consequência, o equilíbrio, agora, não só
existe, mas também é único. Aliás, se, além disso, os efeitos diretos são mais
significativos que os efeitos cruzados, esse equilíbrio se configura estável
(Debreu, 1959; Arrow & Hahn, 1971; Starr, 2011).</span></span><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 35.4pt;"><a name="Naturally__since_the_functions"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Naturalmente, visto que as funções (correspondências)
que explicam a existência do equilíbrio estão associadas à maximização de cada
um dos agentes da economia, dos consumidores e das empresas, o equilíbrio geral
resultante também constitui a otimalidade de Pareto. Nenhum indivíduo poderia aprimorar
o seu bem-estar sem causar algum dano a outros. Um mundo “maravilhoso”, exceto
pela sua falta de validade empírica, pois os últimos 250 anos provaram a
existência de retornos crescentes. E é aí que surge “o problema” das não convexidades,
o qual, diante dos danos que elas causam à otimalidade de Pareto, exige a
correção das “falhas de mercado” pelo governo.</span></a></p>
<p align="center" class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: center; text-indent: 0cm;"><b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Programa de Pesquisa
Neoclássico, Socialismo e Rothbard</span></b></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Here_s_where_two_debates_arise;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">É
aqui que surgem dois debates. Por um lado, quando nos aprofundamos na análise
neoclássica, sempre quando o resultado não estiver conforme as restrições
impostas pela matemática da otimização, precisamos entrar no campo das supostas
falhas de mercado, que são basicamente o resultado de (1) não convexidades
(estruturas de mercado concentrado) cuja contraparte matemática são funções com
retornos crescentes (não maximizáveis a menos que uma restrição efetiva seja
aplicada ao conjunto de dotações iniciais); (2) bens públicos; (3) externalidades,
tanto no consumo quanto na produção; e (4) a presença de informações
assimétricas.</span></span><a name="On_the_other_hand__if_we_focus_o"></a><a name="hand"></a><a name="ITerm33"></a><a name="information_47"></a><span style="mso-bookmark: On_the_other_hand__if_we_focus_o;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: On_the_other_hand__if_we_focus_o;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Por
outro lado, caso nós nos concentremos no modelo neoclássico de crescimento
econômico de Solow-Swan, como é que seja possível que o processo de acumulação
de capital, de tamanha importância, responda por apenas 15% (Solow, 1957)? A
resposta é que a produtividade e a sua evolução ao longo do tempo estão
relacionadas a retornos de escala. Em outras palavras: como pode ser que a
teoria neoclássica afirme que os monopólios sejam ruins se, durante esse
processo, o nível de pobreza extrema no mundo diminuiu de 95% para 5% em meio a
um aumento de prosperidade sem precedentes na história da humanidade? Isso parece
não fazer sentido algum </span></span><span style="mso-bookmark: On_the_other_hand__if_we_focus_o;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: On_the_other_hand__if_we_focus_o;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> e quem consegue
desvendar esse mistério é Murray Rothbard no seu artigo “Monopólio e
Concorrência”, que faz parte do livro <span class="00Text"><i>Man, Economy and State</i></span><i>
</i>(Rothbard, 1962) (“Homem<a name="economic_growth_5"></a><a name="evolution_17"></a><span class="00Text"><span style="font-style: normal;">,
Economia e Estado”)</span></span>.</span></span></p>
<p align="center" class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: center; text-indent: 0cm;"><b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Murray Rothbard, os Danos
dos Monopólios e a Otimalidade</span></b></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Strictly_speaking__to_determine;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">A
rigor, para determinar se os monopólios são ruins ou não, é necessário entender
a sua definição. De acordo com Lord Coke, o monopólio configura um privilégio
especial concedido pelo governo, por meio do qual um setor produtivo específico
é reservado em prol de um determinado indivíduo ou grupo </span></span><span style="mso-bookmark: Strictly_speaking__to_determine;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: Strictly_speaking__to_determine;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> e onde a participação de outros membros da sociedade
é proibida, imposta pelo aparato repressivo do governo.</span></span><a name="Accordingly__there_are_only_two"></a><a name="monopolies"></a><span style="mso-bookmark: Accordingly__there_are_only_two;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Accordingly__there_are_only_two;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Existem,
portanto, apenas duas maneiras de estabelecer preços para os bens. Uma delas é o
jeito do livre mercado, em que os preços são estabelecidos voluntariamente
pelos indivíduos participantes do mercado, beneficiando assim todos aqueles que
realizam trocas. A outra maneira é a intervenção violenta no mercado por meios
hegemônicos, em que os preços são impostos com a exclusão das trocas livres e a
introdução da exploração do homem pelo homem, pois acontece exploração sempre
quando ocorre uma troca submetida à coerção. Em consequência, não importa se há
um fornecedor ou milhões deles; o que é importante é se existe liberdade ou
coerção. Assim, no caso do livre mercado, consumidores e produtores regulam os seus
atos em cooperação voluntária. Portanto, não faz sentido falar em preços
monopolistas (como sinônimos para preços “altos” e restrição da produção)
quando não há coerção e o acesso ao mercado é livre. Nas palavras de Mises
(1952, p. 115): “Se é para alguém levar a culpa pelo fato de o número de participantes
no mercado não ser maior, então aqueles que já estão operando no mercado não
são o alvo, mas sim aqueles que ainda não entraram no mercado.”</span></span><a name="Accordingly__there_is_nothing_wr"></a><a name="free_market_13"></a><a name="free_market_14"></a><a name="Mises_32"></a><span style="mso-bookmark: Accordingly__there_is_nothing_wr;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Accordingly__there_is_nothing_wr;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Portanto,
não há nada de errado com um monopólio, a menos que ele seja resultado de uma
ação violenta perpetrada pelo governo. De fato, dentro de uma estrutura de
trocas livres, se um produtor é capaz de capturar todo o mercado, ele satisfez
com sucesso as necessidades dos seus semelhantes ao lhes fornecer um produto de
melhor qualidade a um preço mais baixo. Além disso, seria inútil ser o único
vendedor de cubos de gelo na Antártida </span></span><span style="mso-bookmark: Accordingly__there_is_nothing_wr;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: Accordingly__there_is_nothing_wr;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> ou produzir com exclusividade todo o vinho numa
comunidade de abstêmios. Ademais, mesmo quando uma situação tão extrema pode
não surgir, existe sempre o possível surgimento de um bem substituto que limite
a capacidade de negociar o preço. Portanto, aquele que usa instrumentos
legítimos permaneceu o único produtor; longe de ser um tirano, é na verdade um
benfeitor social; e irá à falência assim que deixar de satisfazer as
necessidades dos seus semelhantes.</span></span><a name="On_the_other_hand__the_existence"></a><span style="mso-bookmark: On_the_other_hand__the_existence;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: On_the_other_hand__the_existence;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Por
outro lado, a existência de monopólios suscita a questão dos retornos
crescentes, o que conduz ao problema da otimalidade de Pareto e, junto com ele,
à possibilidade de uma empresa assumir o controle da economia. Em relação ao
primeiro caso, não é verdadeiro que uma função crescente não possa ser
maximizada quando existe um limite no número de suprimentos. Na verdade, o
lucro máximo seria dado quando a dotação de fatores da economia fosse esgotada,
exaurida. Com base nesse resultado, surge a questão do tamanho do monopólio. No
entanto, essa consideração decorre do desconhecimento da questão da
impossibilidade de aplicação do cálculo econômico: se esse planejamento central
era realmente eficiente, por que não foi estabelecido pelos indivíduos que
buscam lucros no livre mercado? Ademais, o fato de que tal caso nunca foi
voluntariamente constituído, assim como o fato de que o poder coercitivo do
governo é necessário para criá-lo, comprova claramente que esse método de modo
algum seria o mais eficiente para satisfazer as demandas dos indivíduos.</span></span><a name="Finally__we_find_the_problem_aro"></a><a name="economic_calculation_5"></a><a name="central_planning_1"></a><a name="free_market_15"></a><a name="power_55"></a><span style="mso-bookmark: Finally__we_find_the_problem_aro;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Finally__we_find_the_problem_aro;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Finalmente,
encontramos o problema em torno da magnitude dos lucros e da destruição de
empregos pela retração das quantidades, caindo naquilo que Bastiat/Hazlitt
definiria como a falácia da janela quebrada. Nesse sentido, se os “monopolistas”
decidissem poupar os seus lucros, tais lucros seriam reinvestidos noutros
setores, gerando, assim, empregos noutro setor. Se os reinvestissem, empregos seriam
criados. Se decidissem consumi-los, empregos seriam criados onde eles
colocassem essa demanda. Se acumulassem o dinheiro ou o destruíssem, a
quantidade nominal de dinheiro cairia até que os equilíbrios reais fossem
restaurados, beneficiando todos na economia. Em consequência, nenhum dano seria
causado à economia enquanto a presença de retornos crescentes constitua uma
fonte de crescimento que eleve o bem-estar. Portanto, a existência de
monopólios num contexto de entrada e saída livres configura uma fonte de
progresso; e a obsessão constante dos políticos em controlá-los só acabará
prejudicando os indivíduos que eles estão tentando auxiliar.</span></span></p>
<p align="center" class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: center; text-indent: 0cm;"><b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Socialismo <i>versus</i>
Capitalismo em Formato Inválido</span></b></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: When_I_was_at_university__I_reme;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Quando
estava na universidade, eu me lembro de uma disciplina chamada “Sistemas
Econômicos Comparados”. Naturalmente, antes de passar às questões empíricas, o
arcabouço teórico incluía uma comparação entre a análise do equilíbrio sob concorrência
perfeita e o “equilíbrio” sob a solução do planejador central socialista.</span></span><a name="All_assumptions_necessary_to_der"></a><a name="_Comparative"></a><span style="mso-bookmark: All_assumptions_necessary_to_der;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: All_assumptions_necessary_to_der;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Todas
as suposições necessárias para derivar um equilíbrio ótimo de Pareto eram
tomadas como ponto de partida. Dessa maneira, as funções de demanda e oferta
(e, portanto, as funções de excesso de demanda) eram determinadas a partir de
formatos específicos para a função de utilidade, para a função de produção e
para as dotações dadas, de modo que o conjunto resultante de funções de excesso
de demanda permitia não apenas encontrar um equilíbrio único e estável, mas
também um ótimo de Pareto. Em outras palavras, um processo descentralizado gerava
um ótimo de Pareto sem a necessidade de intervenção governamental.</span></span><a name="On_the_other_hand__the_case_of_t"></a><span style="mso-bookmark: On_the_other_hand__the_case_of_t;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: On_the_other_hand__the_case_of_t;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Por
outro lado, o caso do planejador central propiciava um ótimo de Pareto. Nessa
fase, o problema torna-se perceptível: parte-se da ideia de que a função de
bem-estar social seja conhecida. Por sua vez, desde que o exercício esteja submetido
à mesma restrição física, presumir uma função de utilidade/bem-estar que
envolva o conhecimento das preferências de todos os indivíduos da economia acerca
de todos os bens da economia significa alcançar um resultado que seja
semelhante não apenas em termos de quantidades ao equilíbrio concorrencial, mas
também que se distribua da mesma maneira; portanto, o equilíbrio sob o planejamento
centralizado permite o mesmo equilíbrio ótimo de Pareto a ser alcançado.</span></span><a name="Let_us_assume_that__up_to_this_p"></a><a name="idea_52"></a><a name="welfare_13"></a><a name="welfare_14"></a><span style="mso-bookmark: Let_us_assume_that__up_to_this_p;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Let_us_assume_that__up_to_this_p;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Suponhamos
que, até aqui, ambos os sistemas sejam equivalentes. O problema, agora, é que
os contextos estão sob o conjunto de pressupostos neoclássicos. Quando aparecem
alguns dos problemas mencionados nas seções anteriores, como a não convexidade
(retornos crescentes), isso leva à conclusão de que a produção sob monopólio é
menor que a produção sob concorrência perfeita; como consequência, a economia
se afasta da otimalidade de Pareto, e é aí que surgem as bases para o
intervencionismo. Entretanto, olhando para a análise dos monopólios fora da
perspectiva neoclássica e compreendendo a cooperação social subjacente ao
processo de mercado, tentar interferir com esses monopólios decorrentes das
livres entrada e saída concorrenciais apenas provocará danos. Ademais, existe
um erro adicional ligado à extrapolação de um caso de equilíbrio parcial para
um caso de equilíbrio geral por meio da omissão da existência da substituição
de bens pelos consumidores.</span></span><a name="Finally__as_if_the_aforementione"></a><a name="interventionism_9"></a><span style="mso-bookmark: Finally__as_if_the_aforementione;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Finally__as_if_the_aforementione;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Finalmente,
como se não bastasse o que foi acima mencionado, a presunção do conhecimento da
função de bem-estar geral, a qual envolve saber as preferências de todos os
indivíduos da economia sobre todos os bens da economia </span></span><span style="mso-bookmark: Finally__as_if_the_aforementione;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: Finally__as_if_the_aforementione;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> saber a medida “exata” sob a qual eles são combinados
para determinar uma função objetiva que permita alcançar um equilíbrio “ótimo” </span></span><span style="mso-bookmark: Finally__as_if_the_aforementione;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—,</span></span><span style="mso-bookmark: Finally__as_if_the_aforementione;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> significa cair naquilo que Hayek chamou de
“arrogância fatal”.</span></span><a name="In_short__the_origin_of_the_cata"></a><a name="welfare_15"></a><a name="Hayek_37"></a><span style="mso-bookmark: In_short__the_origin_of_the_cata;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: In_short__the_origin_of_the_cata;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Em resumo:
a origem da catástrofe foi a validação de um modelo laboratorial baseado numa
série de postulados irrealistas que acabaram por dar suposta viabilidade à
intervenção violenta nos mercados em busca de um suposto bem-estar máximo que apenas
promove a ruína da economia e da sociedade. É assim que aparecem coletivistas e
falsos vingadores sociais, buscando punir um grupo de pessoas ao lhes roubar os
frutos do seu trabalho para entregá-los a outros.</span></span><a name="Moreover__within_the_aforementio"></a><span style="mso-bookmark: Moreover__within_the_aforementio;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: Moreover__within_the_aforementio;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Ademais,
dentro do modelo acima citado, cabe destacar que, sob a perspectiva
neoclássica, o progresso tecnológico não configura um ótimo de Pareto </span></span><span style="mso-bookmark: Moreover__within_the_aforementio;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: Moreover__within_the_aforementio;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> e, portanto, sem progresso tecnológico, nenhum
crescimento é possível (Barro & Sala-I-Martin, 2004). Mas, além disso, se
trabalharmos com funções de produção estritamente côncavas, o crescimento
também não pode ser explicado (exceto pelo truque de externalidade do capital
agregado de Marshall/Young). Então, se você possui uma teoria econômica
conceitual no laboratório que não é realmente aplicável na prática, ela não
apenas é inútil, mas o seu uso conduzirá a desastres como o comunismo, o qual é
sempre uma ameaça dentro do círculo vicioso de intervenção que Hayek brilhantemente
descreveu na obra <a name="Hayek_38"></a><span class="00Text"><i>O Caminho para a
Servidão</i></span>.</span></span></p>
<p align="center" class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: center; text-indent: 0cm;"><b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Conclusão</span></b></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: The_neoclassical_paradigm__based;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">O
paradigma neoclássico, baseado na concorrência perfeita, tentando construir um
equilíbrio que existe, que é único e estável, gerando, por sua vez, otimalidade
sob o conceito de Pareto, culminou num abuso da matemática que, em última
análise, acabou por ser funcional ao socialismo. Perceba-se que, sempre quando
surgem situações que não condizem com a estrutura matemática, elas são
consideradas “falhas de mercado”, e é aí que o governo parece corrigir essas
falhas. Entretanto, para resolver com sucesso esse problema, supõe-se que o
governo saiba a função de utilidade de todos os indivíduos (preferências) para
o passado, o presente, o futuro, assim como a taxa de preferência temporal, e
conheça a situação da tecnologia atual e todos os aprimoramentos futuros,
juntamente com as suas respectivas taxas de amortização. Em resumo, para
resolver o problema em questão, o governo deve ser capaz de dominar uma
quantidade significativa de informação que, por definição, os próprios
indivíduos ignoram (ou com a qual não são capazes de lidar) </span></span><span style="mso-bookmark: The_neoclassical_paradigm__based;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: The_neoclassical_paradigm__based;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> o que expõe a contradição que é a ideia do estado assistencialista
atuando no mercado para corrigir falhas.</span></span><a name="The_conceptual_counterpart_of_th"></a><a name="state_9"></a><a name="information_48"></a><a name="idea_53"></a><span style="mso-bookmark: The_conceptual_counterpart_of_th;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="Para03" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="mso-bookmark: The_conceptual_counterpart_of_th;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">A
contraparte conceitual desse problema é o caso de Robinson Crusoé. Suponha-se
que paremos para refletir sobre isso por um tempo. Nesse caso, perceberemos que
Crusoé, num momento, opera como consumidor e que, noutro, opera como produtor,
iniciando então um processo de tentativa-e-erro que lhe permite encontrar o
vetor de equilíbrio de preços de forma que, no final do dia, ele possa decidir
quanto consome e quanto trabalha </span></span><span style="mso-bookmark: The_conceptual_counterpart_of_th;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: The_conceptual_counterpart_of_th;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> algo que é
obviamente bastante inventado.</span></span><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 35.4pt;"><a name="Therefore__when_it_is_made_clear"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Portanto, quando se deixa claro que a correção de
falhas de mercado pelo governo, tal como proposta no paradigma neoclássico, é
conceitualmente inválida, levando-se em consideração que os únicos que podem
internalizar esses efeitos são os indivíduos, uma vez eliminada a separação
artificial dos processos de tomada de decisão, não mais existirá qualquer motivo
para a intervenção governamental </span></a><span style="mso-bookmark: Therefore__when_it_is_made_clear;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-themecolor: text1;">—</span></span><span style="mso-bookmark: Therefore__when_it_is_made_clear;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"> o que não apenas irá
sustar o avanço socialista, mas também irá nos permitir contra-atacar.</span></span><a name="References_17"></a><a name="socialist_advance"></a><span style="mso-bookmark: References_17;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p align="center" class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: center; text-indent: 0cm;"><span style="mso-bookmark: References_17;"><b><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Referências</span></b></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><span style="mso-bookmark: References_17;"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Arrow, K. & Hahn, F. (1971). </span></span><span style="mso-bookmark: References_17;"><span class="00Text"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><i>General
Competitive Analysis</i></span></span></span><span style="mso-bookmark: References_17;"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">.
Holden-Day.<o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><span style="mso-bookmark: References_17;"><a name="Barro__R_____Sala_I_Martin__X"><span style="color: black; font-family: "Garamond",serif; mso-ansi-language: PT-BR; mso-themecolor: text1;">Barro, R. &
Sala-I-Martin, X. (2004). </span></a></span><span style="mso-bookmark: References_17;"><span style="mso-bookmark: Barro__R_____Sala_I_Martin__X;"><span class="00Text"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><i>Economic
Growth</i></span></span></span></span><span style="mso-bookmark: References_17;"><span style="mso-bookmark: Barro__R_____Sala_I_Martin__X;"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">. MIT
Press.</span></span></span><span style="mso-bookmark: References_17;"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><span style="mso-bookmark: References_17;"><a name="Debreu__G___1959___Theory_of_Val"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">Debreu, G. (1959). <span class="00Text"><i>Theory
of Value</i></span>. Wiley.</span></a></span><span style="mso-bookmark: References_17;"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><span style="mso-bookmark: References_17;"><a name="Hayek__F__A___1944___The_Road_to"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">Hayek, F. A. v. (1944). <span class="00Text"><i>The
Road to Serfdom</i></span>. George Routledge & Sons LTD.</span></a></span><span style="mso-bookmark: References_17;"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><span style="mso-bookmark: References_17;"><a name="Laffont__J__J___1988___Fundament"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">Laffont, J. J. (1988). <span class="00Text"><i>Fundamentals
of Public Economics</i></span>. MIT Press.</span></a></span><span style="mso-bookmark: References_17;"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><span style="mso-bookmark: References_17;"><a name="Maddison__A___2007___Contours_of"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">Maddison, A. (2007). <span class="00Text"><i>Contours
of the World Economy</i></span>. Editorial, Oxford University Press.</span></a></span><span style="mso-bookmark: References_17;"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><span style="mso-bookmark: References_17;"><a name="Malthus__T___1798___An_Essay_on"><span class="00Text"><span lang="EN" style="color: black; font-family: "Garamond",serif; font-style: normal; mso-themecolor: text1;">Malthus, T. (1798).</span></span></a></span><span style="mso-bookmark: References_17;"><span style="mso-bookmark: Malthus__T___1798___An_Essay_on;"><span class="00Text"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"> </span></span></span></span><span style="mso-bookmark: References_17;"><span style="mso-bookmark: Malthus__T___1798___An_Essay_on;"><i><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">An
Essay on the Principle of Population<span class="00Text">. </span></span></i></span></span><span style="mso-bookmark: References_17;"><span style="mso-bookmark: Malthus__T___1798___An_Essay_on;"><span class="00Text"><span lang="EN" style="color: black; font-family: "Garamond",serif; font-style: normal; mso-themecolor: text1;">W. Pickering.</span></span></span></span><span style="mso-bookmark: Malthus__T___1798___An_Essay_on;"></span><span style="mso-bookmark: References_17;"><span class="00Text"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><o:p></o:p></span></span></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><span style="mso-bookmark: References_17;"><a name="Mises__L__v___1952___Planning_fo"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">Mises, L. v. (1952). <span class="00Text"><i>Planning
for Freedom</i></span>. Libertarian Press.</span></a></span><span style="mso-bookmark: References_17;"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><a name="Romer__P___1986___Increasing_Ret"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">Romer, P. (1986). Increasing Returns and
Long-Run Growth. <i><span class="00Text">Journal of Political Economy, 94</span>(5)</i>
(October), 1002, 1037.</span></a><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><a name="Rothbard__M__N___1962___Man__Eco"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">Rothbard, M. N. (1962). <span class="00Text"><i>Man,
Economy and State</i>.</span> William Volker Fund and D. Van Nostrand.</span></a><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><span style="mso-bookmark: References_17;"><a name="Smith__A___1776___An_Inquiry_int"><span class="00Text"><span lang="EN" style="color: black; font-family: "Garamond",serif; font-style: normal; mso-themecolor: text1;">Smith, A. (1776). </span></span></a></span><span style="mso-bookmark: References_17;"><span style="mso-bookmark: Smith__A___1776___An_Inquiry_int;"><i><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">An
Inquiry into the Nature and Causes of the Wealth of Nations</span></i></span></span><span style="mso-bookmark: References_17;"><span style="mso-bookmark: Smith__A___1776___An_Inquiry_int;"><span class="00Text"><span lang="EN" style="color: black; font-family: "Garamond",serif; font-style: normal; mso-themecolor: text1;">. University of Chicago Press.</span></span></span></span><span style="mso-bookmark: References_17;"><span class="00Text"><span lang="EN" style="color: black; font-family: "Garamond",serif; font-style: normal; mso-themecolor: text1;"><o:p></o:p></span></span></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><a name="Solow__R___1956___A_Contribution"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">Solow, R. (1956). <i>A Contribution to the
Theory of Economic Growth</i>. <span class="00Text">Quarterly Journal of Economics,
70</span>(1), 65–94.</span></a><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><a name="Solow__R___1957___Technical_Chan"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">Solow, R. (1957). Technical Change and the
Aggregate Production Function. <i><span class="00Text">The Review of Economics and
Statistics, 39</span>(3)</i>, 312–320.</span></a><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><span style="mso-bookmark: References_17;"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">Starr, R.
(2011). <span class="00Text"><i>General Equilibrium Theory: An Introduction</i></span>.
Cambridge University Press.<o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; mso-char-indent-count: 0; text-align: justify; text-indent: 0cm;"><span lang="EN" style="color: black; font-family: "Garamond",serif; mso-themecolor: text1;">Usawa, H.
(1961). Neutral Inventions and the Stability of Growth Equilibrium. <span class="00Text" style="font-style: italic;">Review of Economic Studies</span><span class="00Text" style="font-style: italic;">, 28 </span>(February), 117–124.</span></p><p></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-28507619273485393262023-09-27T11:41:00.005-07:002023-09-27T11:43:08.971-07:00O Nosso Frágil Planeta (Walter E. Williams)<p><span style="color: #333333; font-family: Garamond, serif; text-align: justify;"></span></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEjDgrJoYHkZe7WkM9pN8zV39E4TYrpT1Lk2MIi1N0utTH2gNXWfnaiiTx6i8aadaVEcx89wf1sMib2BWjd04EG1MZARwB70i03ojc0hz1xj6GkHtjEr2xeDRxGeSSXfe0CwI-ifKZr_Gm2bhV7mMQmxCE6L2KcmnlOPFBcVEm558J5QSxgElahTYDG2njg" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="1000" data-original-width="1000" height="400" src="https://blogger.googleusercontent.com/img/a/AVvXsEjDgrJoYHkZe7WkM9pN8zV39E4TYrpT1Lk2MIi1N0utTH2gNXWfnaiiTx6i8aadaVEcx89wf1sMib2BWjd04EG1MZARwB70i03ojc0hz1xj6GkHtjEr2xeDRxGeSSXfe0CwI-ifKZr_Gm2bhV7mMQmxCE6L2KcmnlOPFBcVEm558J5QSxgElahTYDG2njg=w400-h400" width="400" /></a></div><br />(11.12.2013)<p></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify;"><span style="color: #333333; font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;"><o:p> </o:p></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Examinemos algumas afirmações que refletem uma
visão que se pensa ser absolutamente inquestionável, além de quaisquer possibilidades
de questionamento. <b>“O mundo em que vivemos é lindo, mas frágil.”</b> <b>“A terceira
pedra a partir do Sol é um oásis frágil.”</b> Aqui estão algumas citações que
apareceram no Dia da Terra: <b>“Lembre-se de que a Terra precisa ser salva
todos os dias.” “Lembre-se da importância de cuidar do nosso planeta. É o único
lar que temos!”</b> Tais declarações, juntamente com previsões apocalípticas,
são ferramentas rotineiras para os ambientalistas — tanto os extremistas quanto
os não extremistas. Pior ainda se mostra o fato de que essa doutrinação de “Terra
frágil” serve de alimento mental e intelectual para os nossos jovens desde o
jardim-de-infância até a faculdade. Analisemos, portanto, o quão frágil a Terra
realmente é.<o:p></o:p></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">A erupção de 1883 do vulcão Krakatoa, localizado
na atual Indonésia, teve a força de 200 megatons de TNT. Isso se demonstra o
equivalente a 13.300 bombas atômicas de 15 quilotons, do tipo que destruiu
Hiroshima em 1945. Antes dessa erupção, ocorreu em 1815 a erupção do vulcão
Tambora, também na atual Indonésia; essa erupção detém o recorde de maior
erupção vulcânica já conhecida. O vulcão lançou tantos detritos na atmosfera,
bloqueando a luz solar, que 1816 ficou marcado como o “Ano Sem Verão” ou o “Verão
que Nunca Ocorreu”. Isso provocou perdas totais de safras agrícolas e de animais
para abate em grande parte do Hemisfério Norte, causando a pior fome do século XIX.
A erupção de 535 d.C. do vulcão Krakatoa apresentou tanta força que bloqueou
grande parte da luz e do calor do Sol por dezoito meses — e há quem diga que essa
erupção deu origem à Idade das Trevas. Geofísicos estimam que somente três
erupções vulcânicas — Indonésia (1883), Alasca (1912) e Islândia (1947) —
expeliram mais dióxido de carbono e dióxido de enxofre na atmosfera que todas
as atividades da humanidade em toda a nossa história.<o:p></o:p></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Como a nossa frágil Terra tem lidado com as
enchentes, os dilúvios, as inundações? A China é provavelmente a capital
mundial das inundações gigantescas. A enchente do Rio Amarelo de 1887 custou
entre 900.000 e 2 milhões de vidas. As inundações de 1931 na China foram ainda piores,
causando um número estimado de mortos entre 1 milhão e 4 milhões. Mas a China
não detém o monopólio das inundações. Entre 1219 e 1530, os Países Baixos (Holanda)
vivenciaram enchentes que custaram cerca de 250.000 vidas.<o:p></o:p></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">E o que dizer do impacto dos terremotos que
assolam a nossa frágil Terra? Ocorreu o terremoto de Valdivia, no Chile, em
1960, que chegou a 9,5 na escala Richter, uma força equivalente a 1.000 bombas
atômicas explodindo ao mesmo tempo. O mortífero terremoto de 1556 na província
chinesa de Shaanxi devastou uma área de 520 milhas (836,859 quilômetros). Temos
o mais recente terremoto de magnitude 9,1 de dezembro de 2004 no Oceano Índico,
o qual provocou o <i>tsunami</i> mortal do Boxing Day (dia seguinte à noite de
Natal; 26.12), assim como um mortífero terremoto de magnitude 9,0 em março de
2011 que atingiu o leste do Japão.<o:p></o:p></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">O nosso frágil planeta já teve de encarar terrores
provenientes do espaço sideral. Há dois bilhões de anos, um asteroide atingiu a
Terra, criando a cratera Vredefort, na África do Sul. Ela tem um raio de 118
milhas (189,903 quilômetros), configurando a maior cratera de impacto do mundo.
Em Ontário, Canadá, existe a Bacia de Sudbury, resultante de uma queda de
meteoro ocorrida 1,8 bilhão de anos atrás, que possui um diâmetro de 81 milhas
(130,357 quilômetros), configurando a segunda maior estrutura de impacto na
Terra. A cratera da Baía de Chesapeake, na Virgínia (EUA), é um pouco menor,
com cerca de 53 milhas de largura (85,295 quilômetros). Além disso, existe a
famosa, mas insignificante Cratera de Barringer, no Arizona (EUA), que não possui
nem mesmo uma milha de largura (uma milha equivale a 1,6 quilômetros).<o:p></o:p></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Assinalei apenas uma ínfima parcela dos
eventos cataclísmicos que têm atingido a Terra — deixando de mencionar
categorias inteiras, como tornados, furacões, precipitações de raios,
incêndios, nevascas, deslizamentos de terra e avalanches. Apesar desses eventos
cataclísmicos, a Terra sobreviveu. A minha pergunta é: Qual desses poderes da
natureza pode ser igualado pelo ser humano? Por exemplo, a humanidade consegue reproduzir
os efeitos poluentes da erupção vulcânica de 1815 do Tambora ou o impacto do
asteroide que aniquilou os dinossauros? É o ápice da arrogância achar que a
humanidade possa provocar mudanças paramétricas significativas na Terra ou possa
chegar ao patamar das forças destrutivas da natureza.<o:p></o:p></span></p>
<p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">Ocasionalmente, os ambientalistas acabam se
entusiasmando e passam a revelar a sua verdadeira agenda, a sua real intenção.
Barry Commoner declarou: <b>“O capitalismo é o inimigo número um da Terra.”</b>
Leo Marx, professor do Amherst College, de Massachussets, EUA, disse: <b>“Tendo
em vista razões ecológicas, a causa em prol do governo mundial está além de quaisquer
questionamentos, dispensando debates.”</b> Com o declínio e o colapso da URSS,
o comunismo perdeu considerável respeitabilidade, sendo agora reempacotado como
ambientalismo e progressismo.<o:p></o:p></span></p><p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">***</span></p><p class="MsoNormal" style="background: white; line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; mso-font-kerning: 0pt; mso-ligatures: none;">(Clique <a href="https://drive.google.com/file/d/1KCHwvmfqu2eb6pF5KQBNVv4uUweLItcw/view?usp=sharing" target="_blank">aqui</a> para baixar o texto em formato PDF.)</span></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-29865504817386782212023-04-16T14:25:00.002-07:002023-04-16T14:25:39.591-07:00Mais um Abuso Estatal (Marcelo Werlang de Assis)<p><br /></p><p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEgQEdbWrqp7deP10Cq6jpd5t87Vjw38ji0Ax2PH_I_8YUfOsWTvblSlQfWGbm54Bz5dUGqOgk30JeWWkQw86uDehi_jnyhUplrxXtB2ThSEzauwPaq9rKuOX-ggMz5kAvLVj_WQ-7VAhvkdG-lj6aMSrnT6-4nQY07kmVmvR8l-whj8ifb3nYBDataN" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="315" data-original-width="580" height="174" src="https://blogger.googleusercontent.com/img/a/AVvXsEgQEdbWrqp7deP10Cq6jpd5t87Vjw38ji0Ax2PH_I_8YUfOsWTvblSlQfWGbm54Bz5dUGqOgk30JeWWkQw86uDehi_jnyhUplrxXtB2ThSEzauwPaq9rKuOX-ggMz5kAvLVj_WQ-7VAhvkdG-lj6aMSrnT6-4nQY07kmVmvR8l-whj8ifb3nYBDataN" width="320" /></a></div><br />O artigo foi publicado no site do Instituto Rothbard. Confira <a href="https://rothbardbrasil.com/mais-um-abuso-estatal/" target="_blank">aqui</a>.<p></p><p>Clique <a href="https://drive.google.com/file/d/1CcpZk2BcoPk8kaTL52W5Hvs9QmoSCDul/view?usp=sharing" target="_blank">aqui</a> para baixar o texto em formato PDF.</p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-39044816225135648422022-11-15T14:33:00.007-08:002022-11-15T14:39:29.924-08:00O Governo Onipotente (Marco Batalha)<p><br /></p><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEjQKt1e9a3D-FahOmm_drJPlJcpwLv3DGOX1MGTDWTnGJNaoysrBpla35NJy39UWw87t65LWezOd6eQc8i8SC-DnUwSnTBBV13wwwCGvIXPz-UKQ9h01izhIvE8RzHHsoQ3pm_0gmwOPtKEK6uF7TecDHuw4DrksyF2TL3QdH-Wxd0tBFMuoqr3yBpC" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="351" data-original-width="600" height="234" src="https://blogger.googleusercontent.com/img/a/AVvXsEjQKt1e9a3D-FahOmm_drJPlJcpwLv3DGOX1MGTDWTnGJNaoysrBpla35NJy39UWw87t65LWezOd6eQc8i8SC-DnUwSnTBBV13wwwCGvIXPz-UKQ9h01izhIvE8RzHHsoQ3pm_0gmwOPtKEK6uF7TecDHuw4DrksyF2TL3QdH-Wxd0tBFMuoqr3yBpC=w400-h234" width="400" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEgSgu33krKpiwjK2nXCF_iO_j8HUqjtBDDZbjWBdByM3EJxTyB7StKL5yCIqlqihMNScJr-2AI2vvfJQXzO26RsVjafcgVZbVPbcd7Ae94kYM3fGrckoF2RMXgHRSR4JV43RBEENGNtR9HI6T6IZaE2GOydHtMH-o9c3BzDnq-q15XL_BpfSS-k-0Hv" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="600" data-original-width="800" height="300" src="https://blogger.googleusercontent.com/img/a/AVvXsEgSgu33krKpiwjK2nXCF_iO_j8HUqjtBDDZbjWBdByM3EJxTyB7StKL5yCIqlqihMNScJr-2AI2vvfJQXzO26RsVjafcgVZbVPbcd7Ae94kYM3fGrckoF2RMXgHRSR4JV43RBEENGNtR9HI6T6IZaE2GOydHtMH-o9c3BzDnq-q15XL_BpfSS-k-0Hv=w400-h300" width="400" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEgEa8NrS_PIyC-qyXIIjIOP2cpa8VoMw2_9kq7evxIznCP5DivSauFnORUe4GdJAO7zRtq7NGwrl34y8LH46-PZ5m7sT9I3dDTXWomD25oRLSQPL5-wSDgC8_n29JcUEc9lf5I85yYsMXFDeONPTkXC1cKD-s_ghaimm_dNNAao8U6s244FnrKLYRWU" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="603" data-original-width="1193" height="203" src="https://blogger.googleusercontent.com/img/a/AVvXsEgEa8NrS_PIyC-qyXIIjIOP2cpa8VoMw2_9kq7evxIznCP5DivSauFnORUe4GdJAO7zRtq7NGwrl34y8LH46-PZ5m7sT9I3dDTXWomD25oRLSQPL5-wSDgC8_n29JcUEc9lf5I85yYsMXFDeONPTkXC1cKD-s_ghaimm_dNNAao8U6s244FnrKLYRWU=w400-h203" width="400" /></a></div></div></div><p></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span style="color: #222222; font-family: Garamond, serif;">(Clique <a href="https://drive.google.com/file/d/1fRZfYBcWhyJi1PVO1wUaQGrhEca9sLOD/view?usp=sharing" target="_blank">aqui</a> para baixar o texto no formato PDF.)</span></p><p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span style="color: #222222; font-family: Garamond, serif;"><br /></span></p><p class="MsoNormal" style="line-height: 115%; text-align: justify;"><i><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">O enfraquecimento do dinheiro torna o
poder estatal praticamente ilimitado.</span></i></p><p class="MsoNormal" style="line-height: 115%; text-align: justify;"><i><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><br /></span></i></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">No seu livro <i>Da Aurora à
Decadência</i>, o historiador Jacques Barzun identifica a Primeira Guerra
Mundial como o ponto crucial para o início da decadência ocidental. Antes, as
pessoas podiam viver as suas vidas livremente, colhendo os frutos </span><span style="font-family: "Garamond",serif; mso-fareast-language: PT-BR;">—<b> </b></span><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">ou sofrendo as consequências </span><span style="font-family: "Garamond",serif; mso-fareast-language: PT-BR;">—<b> </b></span><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">das suas ações. Depois, as pessoas
passaram a ver o estado como um ente que satisfaria os seus desejos e as
protegeria de más consequências. Social, econômica e politicamente, o papel do
estado foi redefinido como o de um gênio da lâmpada. Bastava as pessoas votarem
para terem todos os seus desejos atendidos. Um outro historiador, Élie Halévy,
também diz que a era das tiranias se iniciou em 1914, com a Primeira Guerra,
quando houve uma nacionalização econômica e uma reorganização da sociedade para
um modelo coletivista.<o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Até então, a solidez do dinheiro
restringia o tamanho do estado, já que este precisava tributar diretamente as
pessoas para se financiar. Depois, com a adoção de um dinheiro fraco, o estado
podia comprar alianças e popularidade sem ter de mostrar a conta para a
população. Bastava inflacionar a moeda para financiar qualquer esquema que lhe
fosse conveniente. Os efeitos só seriam sentidos depois, quando houvesse um
aumento generalizado nos preços. Quando isso acontecia, os políticos podiam
colocar a culpa em outros entes, como banqueiros, empresários, estrangeiros ou
facções políticas rivais. Aliás, o dinheiro fraco é particularmente deletério
em uma democracia, na qual os políticos encaram pressões para se reelegerem. Os
eleitores tendem a preferir justamente os que prometem almoços grátis
impossíveis.<o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">O dinheiro fraco está na raiz das
ilusões modernas dos eleitores e dos coitados que tiveram a infelicidade de
estudar economia em universidades. Eles acreditam que as ações estatais não têm
custos de oportunidade e que o Leviatã pode usar uma varinha-de-condão para
moldar a realidade a seu bel-prazer. Seja a redução da pobreza, a oferta de educação
“pública, gratuita e de qualidade”, um sistema universal de saúde </span><span style="font-family: "Garamond",serif; mso-fareast-language: PT-BR;">—<b> </b></span><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">ou coisas afins </span><span style="font-family: "Garamond",serif; mso-fareast-language: PT-BR;">—</span><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">, eles acreditam que a lei da oferta
e procura pode ser ignorada. Eles vivem em uma terra de sonhos, em que essas
demandas não têm custos reais. Eles creem que tudo que seja necessário para
atingir esses objetivos é “vontade política” ou “escolher o líder certo” ou
“acabar com a corrupção”. Eles ficariam chocados caso descobrissem que
políticos não podem conjurar isso do nada.<o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Agora, imagine se descobrissem que
tudo isso precisa ser proporcionado por pessoas reais </span><span style="font-family: "Garamond",serif; mso-fareast-language: PT-BR;">—</span><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"> que têm de acordar cedo para
produzir os almoços supostamente grátis. Ainda que nenhum político tenha sido
eleito por reconhecer essa realidade, a urna de votação não pode eliminar a
escassez dos recursos. Quando o estado oferece algo, não está melhorando a
economia </span><span style="font-family: "Garamond",serif; mso-fareast-language: PT-BR;">—</span><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"> está apenas a
planejando centralmente, com as terríveis consequências que conhecemos tão bem.
O dinheiro fraco foi uma bênção para os déspotas, pois lhes permitiu camuflar
os custos do aumento da base monetária. Eles passaram a se financiar via
inflação, deixando a conta para a população, que via o seu poder de compra
evaporar e não associava isso à expansão monetária. E é isso que experimentamos
neste mundo fiduciário em que vivemos.<o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Não é por acaso que, olhando para os
eventos mais tirânicos da história, encontramos o fato de todos ocorrerem sob
um sistema monetário controlado pelo estado com mãos-de-ferro e constantemente
inflacionado para financiar as operações governamentais. Há uma boa razão pela qual
tiranos do porte de Stalin tenham governado em períodos de dinheiro fraco, que
era impresso à vontade para viabilizar os seus mandos e desmandos. É a
mesmíssima razão pela qual as sociedades que os pariram não promoveram ninguém
do mesmo nível quando estavam sob um sistema monetário forte. Note que nenhum
desses déspotas enfraqueceu o dinheiro depois de ter assumido o poder. O
dinheiro teve de ser enfraquecido antes para que eles pudessem assumi-lo. Com o
dinheiro fraco, ficou muito fácil a tomada do poder.<o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Esse enfraquecimento do dinheiro
sempre acontece com promessas de almoços grátis: de educação, saúde,
segurança e todos os tipos de “direitos” possíveis e imagináveis. Um canto de
sereia... O dinheiro fraco torna o poder do Leviatã praticamente ilimitado, com
consequências terríveis para os indivíduos. A política torna-se o centro das
suas vidas, drenando boa parte dos recursos e da energia da sociedade para um
jogo de soma-zero, em que os vassalos precisam perder para que os suseranos
ganhem. Já um dinheiro sólido por si só limita o poder estatal, permitindo à
grande maioria dos indivíduos um alto grau de liberdade nas suas vidas
pessoais, qualquer que seja o regime sob o qual vivam. Se o dinheiro é fraco,
temos o exato oposto. Com o crescimento do poder estatal, mais e mais
liberdades individuais são tolhidas.<o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Neste momento, vale a pena
retornarmos às ideias de John Maynard Keynes para entender as motivações do
sistema econômico que ele propõe </span><span style="font-family: "Garamond",serif; mso-fareast-language: PT-BR;">—</span><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"> o sistema sob o qual temos vivido nas últimas décadas. Em um artigo
intitulado “O Fim Do Laissez-Faire”, ele descreve como deveria ser o papel do
estado. Keynes defende que o estado não deve se preocupar com “coisas triviais
como liberdades individuais”, mas sim com o completo controle socioeconômico.
Para isso, o estado deve: (1) controlar a moeda e o crédito por meio de uma
instituição central; (2) decidir o nível de poupança da sociedade; e (3)
determinar o tamanho populacional ideal. Escreve ele:<o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; margin-left: 35.4pt; text-align: justify; text-indent: 35.4pt;"><i><span style="color: #070707; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p> </o:p></span></i></p>
<p class="MsoNormal" style="line-height: 115%; margin-left: 35.4pt; text-align: justify; text-indent: 35.4pt;"><i><span style="color: #070707; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Uma política nacional sobre o tamanho populacional, se maior ou menor
que o atual, é de suma importância. Tendo a definido, podemos discutir como
colocá-la em prática.<o:p></o:p></span></i></p>
<p class="MsoNormal" style="line-height: 115%; margin-left: 35.4pt; text-align: justify; text-indent: 35.4pt;"><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p> </o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Em outras palavras, a concepção
keynesiana de estado, da qual vem a doutrina moderna de bancos centrais e que
molda a grande maioria dos livros acadêmicos econômicos, origina-se de uma
pessoa que queria o estado controlando dois aspectos fundamentais das nossas
vidas: <b>primeiro</b>, das decisões econômicas envolvendo dinheiro, crédito,
poupança e investimentos, o que implica centralização totalitária da alocação
de capital, destruição dos empreendimentos individuais e dependência do governo
para a subsistência; e, <b>segundo</b>, controle da qualidade e da quantidade
populacional. Só a ponerologia mesmo para explicar isso. Em um sistema assim, o
dinheiro deixa de funcionar como um sistema de informação para otimizar a
produção e passa a ser um programa de fidelidade ao estado. É nesse sistema que
hoje vivemos.<o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><br /></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><em><span style="background: white; color: #222222; font-family: "Garamond",serif;">[Este texto baseia-se em um trecho do sétimo capítulo do livro “The Bitcoin
Standard”, de Saifedean Ammous.]</span></em></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span style="color: #222222; font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p> </o:p></span></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-53713446459196145412022-10-01T15:07:00.004-07:002023-04-01T12:27:10.253-07:00A Abordagem de Tom Brady para Viver uma Vida de Maestria (Barry Brownstein)<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEiwseOIoFxVTokQ3kWOV046YTwaOYvSFq188UKlJ5xH4AGcT_EJWcQbYc6MXmIqFQi_Ia3F8TSDq5rJqHvJLiEPuDrntnDwlgHt9NTFKQAT_UPeMejokGL67pMvtG-8NEfcXQHMwose5gfLDxj9uKbP7lcelBO6A-fAqhZZetTKzYZ59l_bC2oi0TV-" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="1064" data-original-width="1080" height="300" src="https://blogger.googleusercontent.com/img/a/AVvXsEiwseOIoFxVTokQ3kWOV046YTwaOYvSFq188UKlJ5xH4AGcT_EJWcQbYc6MXmIqFQi_Ia3F8TSDq5rJqHvJLiEPuDrntnDwlgHt9NTFKQAT_UPeMejokGL67pMvtG-8NEfcXQHMwose5gfLDxj9uKbP7lcelBO6A-fAqhZZetTKzYZ59l_bC2oi0TV-" width="305" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;">Clique <a href="https://drive.google.com/file/d/1BNyfXRZ2kW_BCNcN9IgVu538dSyybgU9/view?usp=sharing" target="_blank">aqui</a> para baixar o texto (formato PDF). Tradução minha.</div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><p class="MsoNormal" style="line-height: 115%;"><span style="font-family: Garamond, serif; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal;">(</span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Publicado em</span><span style="font-family: Garamond, serif; font-variant-caps: small-caps; font-variant-east-asian: normal; font-variant-numeric: normal;">: 23.04.2017)</span></p><p class="MsoNormal" style="line-height: 115%;"></p><p class="MsoNormal" style="line-height: 115%;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-bidi-font-weight: bold; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p> </o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">No seu livro clássico
sobre treino e prática,<i> <span style="color: red;"><a href="https://drive.google.com/file/d/1sDiD2DGDU2MvRRJqOcZWJILek6AXC4xS/view?usp=sharing"><span style="color: red; text-decoration: none; text-underline: none;">Mastery: The Keys to
Success and Long-Term Fulfillment</span></a></span><span color="windowtext">
[“Maestria: As Chaves para o Sucesso e a Realização a Longo Prazo”]</span></i>,
George Leonard observa que muitos de nós se condicionaram a achar que a vida seja
uma “série interminável de momentos de clímax”.</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p> </o:p></span></p>
<p align="center" class="MsoNormal" style="line-height: 115%; text-align: center;"><b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">A vida não é só títulos de
Super Bowl</span></b><b><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></b></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p> </o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Escrevendo no início dos
anos 1990, Leonard fez esta observação sobre comerciais de televisão: “A
corrida é disputada e vencida; jovens bonitos movimentam-se em êxtase para cima
e para baixo enquanto pegam latas geladas de Coca-Cola <i>diet</i>. Pessoas são
mostradas trabalhando nos seus escritórios por somente um segundo e meio, depois
já é hora de celebrar e confraternizar.”</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">A mensagem desses
comerciais se resume a soluções rápidas para os problemas da vida. “Uma
epifania segue outra. Uma fantasia é ultrapassada pela próxima. Um clímax
empilha-se noutro clímax. Não há platô”, constata Leonard.</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Se você olha para a vida
de Tom Brady através de uma lente superficial, ela parece ser uma sequência de momentos
de clímax, um após o outro. Na exígua lista dos melhores <i>quarterbacks</i> de
todos os tempos, Brady tem cinco títulos de Super Bowl e quatro prêmios de MVP de
Super Bowl (<i>“most valuable player”</i> </span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">—</span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"> “jogador mais valioso” ou, simplesmente, “destaque
da final”), além de uma família amorosa. <i>[Atualmente, em 2022, ele ostenta <b>sete</b>
títulos de Super Bowl e <b>cinco</b> prêmios de MVP de Super Bowl.]</i></span><i><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></i></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Se você acredita que o
segredo do sucesso de Brady é o seu talento ilimitado, você pode estar perdendo
o ponto principal da história de Tom Brady.</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Quando Brady, em 1996, matriculou-se
na Universidade de Michigan, ele era apenas o sétimo na fileira de <i>quarterbacks</i>
da instituição. O tempo de jogo era tão escasso que Brady contratou um
psicólogo esportivo para ajudá-lo a superar a sua frustração, a sua ansiedade.</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Saindo da faculdade, ele
foi selecionado somente na sexta rodada do <i>draft</i> da NFL de 2000. Poucos
esperavam que Brady se tornasse um excelente <i>quarterback</i> profissional.
Ele começou a sua carreira no New England Patriots apenas como o quarto na fileira
dos <i>quarterbacks</i>.</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p> </o:p></span></p>
<p align="center" class="MsoNormal" style="line-height: 115%; text-align: center;"><b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Que dor você quer aguentar?</span></b><b><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></b></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p> </o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Ao contrário de Brady,
alguns de nós lamentam as nossas vidas. Para qualquer um que escute, recitamos as
nossas histórias de como e por que as coisas não deram certo para nós.</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Estamos muito focados num
objetivo, mas não o suficiente no esforço necessário para alcançar esse
objetivo?</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">“</span><span style="color: red; font-family: "Garamond",serif;"><a href="https://markmanson.net/question"><span style="color: red; text-decoration: none; text-underline: none;">The Most Important Question of Your Life</span></a></span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">” <i>[“A Questão Mais
Importante da Sua Vida”]</i> é um ensaio de Mark Manson. Nele, o autor
compartilha o seu falso sonho de se tornar uma estrela do <i>rock</i>,
confessando:</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; margin-left: 35.4pt; text-align: justify; text-indent: 36pt;"><b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Eu estava apaixonado pelo resultado </span></b><b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">—</span></b><b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"> uma imagem de mim no
palco; pessoas vibrando e aplaudindo; eu agitando; eu derramando o meu coração
naquilo que está sendo tocado </span></b><b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">—</span></b><b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">, mas não estava apaixonado pelo processo. E,
por causa disso, falhei. Repetidamente. Inferno, eu nem mesmo me esforcei o
suficiente para falhar. Na prática, nem mesmo tentei.</span></b><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">O sonho de Manson era “falso”
porque ele não estava pronto para pagar o preço do sucesso. “O que determina o seu
sucesso não é: ‘O que você deseja desfrutar?’. A questão é: ‘Que dor você quer aguentar?’
(...) [Se] você deseja os benefícios de algo na vida, também deve querer os
custos”, escreve Manson.</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p> </o:p></span></p>
<p align="center" class="MsoNormal" style="line-height: 115%; text-align: center;"><b><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Amando o platô</span></b><b><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></b></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p> </o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Aos 39 anos <i>[agora,
em 2022, Brady está com 45 anos]</i>, muito depois da idade em que a maioria
dos jogadores de futebol americano costuma se aposentar, Tom Brady ainda está <span style="color: red;"><a href="https://www.businessinsider.com/tom-brady-says-diet-lifestyle-saved-his-career-2017-2"><span style="color: red; text-decoration: none; text-underline: none;">disposto a pagar o
preço de alcançar a maestria</span></a></span>. A dieta rigorosamente orgânica
de Brady <span style="color: red;"><a href="https://www.boston.com/sports/new-england-patriots/2016/01/04/meet-the-chef-who-decides-what-tom-brady-eatsand-what-he-definitely-doesnt/"><span style="color: red; text-decoration: none; text-underline: none;">consiste em</span></a></span>
vegetais, grãos integrais e proteínas magras. Nada de café. Nada de laticínios.
Para evitar inflamações no seu corpo, Brady fica longe de alimentos da família
das solanáceas, como tomates e batatas.</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Dedicado à sua família,
Brady não se sente atraído pela cena social. Ele encontra-se na cama por volta
das nove horas da noite e não toma bebida alcoólica. No treinamento, evita o levantamento
de pesos pesados em prol de exercícios de flexibilidade. Isso, acredita Brady,
reduz as suas chances de lesões nos jogos.</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Fergus Connolly, diretor
de desempenho de futebol americano da Universidade de Michigan, <span style="color: red;"><a href="https://www.theguardian.com/sport/2017/apr/04/tom-brady-sports-science-lifestyle-health-longevity"><span style="color: red; text-decoration: none; text-underline: none;">está certo de que</span></a></span>,
“ao nível de Brady, a maneira como você cuida dos seus genes importa mais que a
sua composição genética”.</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">No campo e fora dele,
Brady parece ser inabalável. </span><span style="color: red; font-family: "Garamond",serif;"><a href="https://www.si.com/nfl/2017/02/07/tom-brady-super-bowl-new-england-patriots-atlanta-falcons"><span style="color: red; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR; text-decoration: none; text-underline: none;">Ele
dá crédito a uma filosofia</span></a></span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"> que impede permitir que as ações dos outros o
perturbem. Será que essa filosofia aumenta o seu desempenho nos dias de jogo
tanto quanto a longevidade da sua carreira no futebol americano? </span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Mesmo depois de ganhar o
Super Bowl, nas palavras de Leonard, “sempre há amanhã, amanhã e amanhã”. A
visão de Leonard é a seguinte: “Se a nossa vida é uma vida boa, uma vida de
maestria, a maior parte dela será despendida no platô.”</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Leonard se pergunta:
Muitas pessoas podem aprender a valorizar o platô? “Caso contrário”, escreve
ele, “uma grande parte [das nossas vidas] pode muito bem ser despendida em
tentativas inquietas, distraídas </span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">—</span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"> em última análise, autodestrutivas </span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">—</span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"> para escapar do platô.”</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Michelângelo famosamente
disse: “Se as pessoas soubessem o quanto eu trabalhei para obter a minha
maestria, ela sequer pareceria tão maravilhosa.”</span><span color="windowtext" style="font-family: "Garamond",serif; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"><o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;">Estamos nos esforçando
para alcançar a maestria nas nossas carreiras </span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Helvetica;">—</span><span style="font-family: "Garamond",serif; mso-bidi-font-family: Arial; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT-BR;"> ou estamos apenas esperando
um clímax chegar? Estamos confiando demais nas nossas boas intenções e
negligenciando o trabalho duro mundano que possibilita uma vida gratificante?</span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><br /></p><p></p></div>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-75228807892458517802022-09-18T07:46:00.005-07:002022-09-18T07:46:52.061-07:00Trecho do livro “O Tigre de Sharpe”, de Bernard Cornwell <span id="docs-internal-guid-056ccde3-7fff-57b0-72de-a953b0236c72"><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="font-family: Spectral, serif; font-size: 12pt; font-variant-east-asian: normal; font-variant-numeric: normal; vertical-align: baseline; white-space: pre-wrap;"></span></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEjalv386sXVGAL-FsuKR7Lx3cxiC73qkUEoRHwuVezCsb_Uzq95jUMgq6AtAPbSOQIOUXhLcnU92RS7rFaXN7nhnZ-lqfCji_usib4M9qhrolsmdDXQBaSSTsXuQt_xzZXgTRHqY3xbFf3zjkNCXOxmFz2xZq935Sw3KGufRS0ZtlLFn0UP0ti-29EA" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="712" data-original-width="875" height="240" src="https://blogger.googleusercontent.com/img/a/AVvXsEjalv386sXVGAL-FsuKR7Lx3cxiC73qkUEoRHwuVezCsb_Uzq95jUMgq6AtAPbSOQIOUXhLcnU92RS7rFaXN7nhnZ-lqfCji_usib4M9qhrolsmdDXQBaSSTsXuQt_xzZXgTRHqY3xbFf3zjkNCXOxmFz2xZq935Sw3KGufRS0ZtlLFn0UP0ti-29EA" width="295" /></a></div><div class="separator" style="clear: both; text-align: center;">(Clique na imagem para melhor visualização)</div></span><p></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="font-family: Spectral, serif; font-size: 12pt; font-variant-east-asian: normal; font-variant-numeric: normal; vertical-align: baseline; white-space: pre-wrap;"><br /></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="font-family: Spectral, serif; font-variant-east-asian: normal; font-variant-numeric: normal; vertical-align: baseline; white-space: pre-wrap;"><span style="font-size: large;">“Sem comércio não há riqueza, e sem riqueza não há sociedade na qual valha a pena viver. Sem comércio, recruta Sharpe, seríamos apenas feras na lama. Vale a pena lutar pelo comércio, embora o bom Deus saiba que não apreciamos muito essa atividade. Nós celebramos reis, honramos grandes homens, admiramos aristocratas, aplaudimos atores, derramamos ouro em pintores. Às vezes até recompensamos soldados e prisioneiros. Mas sempre desprezamos os mercadores. Por quê? É a riqueza do mercador que move os moinhos, Sharpe. Essa riqueza tece roupas, bate martelos, sopra velas de navios, abre estradas, forja ferro, cultiva trigo, assa pão e constrói igrejas, chalés e palácios. Sem comércio e sem Deus nada seríamos.”</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="font-size: large;"><span style="font-family: Spectral, serif; font-variant-east-asian: normal; font-variant-numeric: normal; vertical-align: baseline; white-space: pre-wrap;">— Coronel McCandless, personagem do livro </span><span style="font-family: Spectral, serif; font-style: italic; font-variant-east-asian: normal; font-variant-numeric: normal; vertical-align: baseline; white-space: pre-wrap;">O Tigre de Sharpe</span><span style="font-family: Spectral, serif; font-variant-east-asian: normal; font-variant-numeric: normal; vertical-align: baseline; white-space: pre-wrap;">, de Bernard Cornwell</span></span></p><div><span style="font-family: Spectral, serif; font-size: 12pt; font-variant-east-asian: normal; font-variant-numeric: normal; vertical-align: baseline; white-space: pre-wrap;"><br /></span></div>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-69870833088156962052022-09-17T14:25:00.001-07:002022-09-17T14:25:21.101-07:00Escravidão Privada vs. Escravidão Pública (Hans-Hermann Hoppe)<p></p><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEjXQqG2Ld87GlyRMLxwV9A_NCypBmyTWIZVlEtGfRcmNh_nXwWbSKqMt3zNFRUOYdJaaD0TqK2OwIu9VhojPtr8VwcramMH4K0_bSQZUqJDjvRv31zhxetMca5S23HtbJ5AbZoSUxYIEi9x2FWaNVdkmxvYB1NRpGjXv5MFERIwmqwQ3QzbPJu01dZl" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="385" data-original-width="600" height="205" src="https://blogger.googleusercontent.com/img/a/AVvXsEjXQqG2Ld87GlyRMLxwV9A_NCypBmyTWIZVlEtGfRcmNh_nXwWbSKqMt3zNFRUOYdJaaD0TqK2OwIu9VhojPtr8VwcramMH4K0_bSQZUqJDjvRv31zhxetMca5S23HtbJ5AbZoSUxYIEi9x2FWaNVdkmxvYB1NRpGjXv5MFERIwmqwQ3QzbPJu01dZl" width="320" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEgwDBKil-41KOGVTiHFyKDcc1VCo9Bo8__XFMHMdRqXfencQccmua4HeOJ-r7dGDk4ZAaN8bADryC8aznsRkcesxYESoU5XXk_4Ohchu0ODR75I1iUjJFaYst-qVHf_I1J9XF7lWVhb3nytSp12kauABIJguIlBrDiGp9-r4bQiA2sFpQTtbdTg1CVg" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="576" data-original-width="1024" height="180" src="https://blogger.googleusercontent.com/img/a/AVvXsEgwDBKil-41KOGVTiHFyKDcc1VCo9Bo8__XFMHMdRqXfencQccmua4HeOJ-r7dGDk4ZAaN8bADryC8aznsRkcesxYESoU5XXk_4Ohchu0ODR75I1iUjJFaYst-qVHf_I1J9XF7lWVhb3nytSp12kauABIJguIlBrDiGp9-r4bQiA2sFpQTtbdTg1CVg" width="320" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEh4GVVdqlA7AGr7eeH69gVtW_wgvhwniuFF2KU6-uDugzCnm7pPeFu-MP0FUpQZGQNJBJiervEEuiEKU4N8tY11HDBhc56Zfbp9d1cp6YF7XSh8IyJysKdvdMZb_nx83v3RUq2RSUwGhWxn63nCu5DVlxwrMJfGUCf2gNit0DA8dq4LiCdwx8CP0xxs" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="531" data-original-width="783" height="217" src="https://blogger.googleusercontent.com/img/a/AVvXsEh4GVVdqlA7AGr7eeH69gVtW_wgvhwniuFF2KU6-uDugzCnm7pPeFu-MP0FUpQZGQNJBJiervEEuiEKU4N8tY11HDBhc56Zfbp9d1cp6YF7XSh8IyJysKdvdMZb_nx83v3RUq2RSUwGhWxn63nCu5DVlxwrMJfGUCf2gNit0DA8dq4LiCdwx8CP0xxs" width="320" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEgkLg3sqcnlgBfktRM92R-Yt7QJTrCS6Haw7j6TuvZ8U7Dzk1o9IvOk-eMwJPTPU_1zAtHS5iZny3yiClVYwsFRm2yiwSZHHkxX_YLiTnXfAKBaj9Mm0jE-z1uOv3EnCCB6K7Y_pwhpS4W9KvB-jGjYyZi4TFl7MEcBcIM13ppt_op7FfjxZBB3iJxd" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="657" data-original-width="1250" height="168" src="https://blogger.googleusercontent.com/img/a/AVvXsEgkLg3sqcnlgBfktRM92R-Yt7QJTrCS6Haw7j6TuvZ8U7Dzk1o9IvOk-eMwJPTPU_1zAtHS5iZny3yiClVYwsFRm2yiwSZHHkxX_YLiTnXfAKBaj9Mm0jE-z1uOv3EnCCB6K7Y_pwhpS4W9KvB-jGjYyZi4TFl7MEcBcIM13ppt_op7FfjxZBB3iJxd" width="320" /></a></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEjzcyW0hkbKFve6YYK1mznowlVXSd8eW-5bNHRQ0yubYGwhx06XyKrJhoICsLxQFiYeBc2U7JMMvlPL8fjnNtlAr38HoIVkBZnw7zHID85oeqFvNbmZRYs9e6wyjRm-qmZSofH_tICgobyRb0x9Thr-OfmiDwh1nUunBG6FnaIAuEKpZIyxu4rca2hY" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="1080" data-original-width="1920" height="180" src="https://blogger.googleusercontent.com/img/a/AVvXsEjzcyW0hkbKFve6YYK1mznowlVXSd8eW-5bNHRQ0yubYGwhx06XyKrJhoICsLxQFiYeBc2U7JMMvlPL8fjnNtlAr38HoIVkBZnw7zHID85oeqFvNbmZRYs9e6wyjRm-qmZSofH_tICgobyRb0x9Thr-OfmiDwh1nUunBG6FnaIAuEKpZIyxu4rca2hY" width="320" /></a></div><div class="separator" style="clear: both; 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text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEjS2WLsfQA0EtdncJTRDSXa_1bVBhunVhef-2kDTqzerIDWXmaAUxUzp85DqZVKrtEU0_u0m0Buslnifr1BFze5V4Hb0qziNrQYhNLCbPvkeZkYMTuxlHd9CWrT7U0TsRvYuVvi06NOKQi05TyDupNiLgUbQh7dXNBk-45IGoF-2kOai4ewxIXLbN70" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="827" data-original-width="1240" height="213" src="https://blogger.googleusercontent.com/img/a/AVvXsEjS2WLsfQA0EtdncJTRDSXa_1bVBhunVhef-2kDTqzerIDWXmaAUxUzp85DqZVKrtEU0_u0m0Buslnifr1BFze5V4Hb0qziNrQYhNLCbPvkeZkYMTuxlHd9CWrT7U0TsRvYuVvi06NOKQi05TyDupNiLgUbQh7dXNBk-45IGoF-2kOai4ewxIXLbN70=w320-h213" width="320" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEjKd3-J__Ec5jDWtq3n5pxkOf-NM312Eh37pwbaoFqQNZpf39peil2RYfYHbZyjcU6By-D7oL9JBqkD3E-NoNOJ0JOu98QABwa1WxkARHUMCKvXEAr5ABLHPP1z3bPB-6t2hWxd4IgQDfaY5tLY7zRuO1chjRt3R1d4EHcDa3vd-B6ElU-ry6gs50GV" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="550" data-original-width="995" height="177" src="https://blogger.googleusercontent.com/img/a/AVvXsEjKd3-J__Ec5jDWtq3n5pxkOf-NM312Eh37pwbaoFqQNZpf39peil2RYfYHbZyjcU6By-D7oL9JBqkD3E-NoNOJ0JOu98QABwa1WxkARHUMCKvXEAr5ABLHPP1z3bPB-6t2hWxd4IgQDfaY5tLY7zRuO1chjRt3R1d4EHcDa3vd-B6ElU-ry6gs50GV=w320-h177" width="320" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div></div></div><p></p><p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 36.0pt;"><span style="color: black; font-family: "Garamond",serif; mso-bidi-font-family: Arial;">A
diferença fundamental entre a propriedade privada governamental (de baixa
preferência temporal) e a propriedade pública governamental (de alta
preferência temporal) pode ser ilustrada pela instituição da escravidão,
contrastando os escravos de propriedade privada — conforme existiam, por
exemplo, na América antes da guerra — com os escravos de propriedade pública —
conforme existiam, por exemplo, na antiga União Soviética e no seu império no
Leste Europeu.</span><span style="font-family: "Garamond",serif;"><o:p></o:p></span></p>
<p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 36.0pt;"><span style="color: black; font-family: "Garamond",serif; mso-bidi-font-family: Arial;">Assim
como os escravos, na condição de propriedade privada, eram ameaçados com
punições caso tentassem fugir, em todo o antigo Império Soviético a emigração
foi banida e punida como uma ofensa criminal — caso necessário, aqueles que
tentavam fugir eram fuzilados. Além disso, normas antivadiagem existiam em todo
lugar, e os governos podiam atribuir qualquer tarefa — bem como todas as
recompensas e todas as punições — a qualquer cidadão. Daí a classificação do
sistema soviético como escravatura. Entretanto, ao contrário de um proprietário
privado de escravos, os donos de escravos da Europa Oriental — de Lênin a
Gorbachev — não podiam vender ou alugar os seus súditos em um mercado de
trabalho e privadamente apropriar as receitas decorrentes da venda ou do
aluguel do seu “capital humano”. Daí a classificação do sistema como escravidão
pública (ou socialista).</span><span style="font-family: "Garamond",serif;"><o:p></o:p></span></p>
<p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 36.0pt;"><span style="color: black; font-family: "Garamond",serif; mso-bidi-font-family: Arial;">Sem
mercados de escravos e de mão-de-obra escrava, as coisas são ainda piores — e
não melhores — para os escravos; inexistindo preços para os escravos e para a
sua mão-de-obra, um proprietário de escravos não pode mais alocar racionalmente
o seu “capital humano”. Ele não é capaz de determinar o valor e a escassez das
suas várias e heterogêneas peças de capital humano; e não pode determinar o
custo de oportunidade do uso desse capital em qualquer emprego e muito menos
compará-lo com a receita correspondente. Portanto, má alocação, desperdício e
“consumo” de capital humano duradouros são os resultados. </span><span style="font-family: "Garamond",serif;"><o:p></o:p></span></p>
<p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 36.0pt;"><span style="color: black; font-family: "Garamond",serif; mso-bidi-font-family: Arial;">A
evidência empírica indica tudo isso. Conquanto ocasionalmente acontecesse o
fato de um proprietário privado de escravos matar um escravo seu — o que
significa o máximo “consumo” de capital humano —, a escravidão socialista na
Europa Oriental resultou no assassinato de milhões de civis. Sob a escravidão
de propriedade privada, a saúde e a expectativa de vida dos escravos aumentaram
em geral. No Império Soviético, os padrões de saúde deterioraram-se
constantemente, e a expectativa de vida realmente caiu nas últimas décadas. O
nível de treinamento prático e de educação dos escravos privados aumentou em
geral. O dos escravos socialistas diminuiu. A taxa de reprodução entre os
escravos de propriedade privada era positiva. Entre as populações de escravos
da Europa Oriental, ela era normalmente negativa. Eram altas as taxas de
suicídio, de autoincapacitação, de rompimentos familiares, de promiscuidade, de
filhos “ilegítimos”, de defeitos congênitos, de doenças venéreas, de aborto, de
alcoolismo e de comportamento bruto ou estúpido entre os escravos privados. Mas
todas essas taxas de “consumo de capital humano” eram ainda maiores entre os
escravos socialistas do antigo Império Soviético. Similarmente, ao passo em que
ocorriam comportamentos moralmente absurdos e violentos entre os escravos de
propriedade privada após a sua emancipação, o embrutecimento da vida social
após a abolição da escravatura socialista foi muito pior, revelando um grau até
mesmo superior de degradação moral.<o:p></o:p></span></p>
<p style="margin: 0cm; text-align: justify; text-indent: 36.0pt;"><span style="color: black; font-family: "Garamond",serif; mso-bidi-font-family: Arial;">—
Hans-Hermann Hoppe, no seu livro <i>Democracia, o Deus que Falhou </i>(capítulo 1)</span></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-31446510129401873352022-09-09T15:07:00.002-07:002022-09-09T15:07:17.063-07:00A Arma de Fogo É a Civilização (Marko Kloos)<p><br /></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEisIo8t2-GTQKS3q_j5GM5PKq_fnMTxs6z4hSah_BIoJn-tGY97pKvNuWmmIc0J-pPS414YOeH5kgB9y8hnRVi0nj_0Gu2lIsPSXPztel3_e30D2iGSdLjPL9PadgdJcuJakRrAg3aR1f1u3Jkv1nmYLdZLqat89Kk4_7waOrrvVMMoztZClV0FuxaR" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="201" data-original-width="251" height="240" src="https://blogger.googleusercontent.com/img/a/AVvXsEisIo8t2-GTQKS3q_j5GM5PKq_fnMTxs6z4hSah_BIoJn-tGY97pKvNuWmmIc0J-pPS414YOeH5kgB9y8hnRVi0nj_0Gu2lIsPSXPztel3_e30D2iGSdLjPL9PadgdJcuJakRrAg3aR1f1u3Jkv1nmYLdZLqat89Kk4_7waOrrvVMMoztZClV0FuxaR" width="300" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEjdZlY0D3tvUDFyN79e5RXdfwBYolVAv-doHU17_YVhXFUIfxR8JuzOXxLcjuJlE78uNud4T3Ubu3UYCmGZflYKOHJ4vLYDTtnD_fEht__D2QXZ1Wou2k9KngaVkEboGVt9XEIN5u9_U_oPEgFoEmdnJwIB7MFAaoQp5w5rmEOCtHW_RgP21FkAyNm_" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="167" data-original-width="302" height="177" src="https://blogger.googleusercontent.com/img/a/AVvXsEjdZlY0D3tvUDFyN79e5RXdfwBYolVAv-doHU17_YVhXFUIfxR8JuzOXxLcjuJlE78uNud4T3Ubu3UYCmGZflYKOHJ4vLYDTtnD_fEht__D2QXZ1Wou2k9KngaVkEboGVt9XEIN5u9_U_oPEgFoEmdnJwIB7MFAaoQp5w5rmEOCtHW_RgP21FkAyNm_" width="320" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEhxe-kDzXoiDVYWj-gf5IxfIRrp-tJpioDNHAg-SFkUR2-gck0gMq_Njoj9UQSE1QH6tcm42NU-kwEho9v2pyaP-qV8Cpzvre5ZT-bz2vDEiXyk8SZ-geVQwRlNwxcAKqE_IrXMqvG2i55rqxsgv2tbqk_mlcMuz96FVhUJ63Y1AtGE9-7oCGRuHMX7" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="179" data-original-width="281" height="204" src="https://blogger.googleusercontent.com/img/a/AVvXsEhxe-kDzXoiDVYWj-gf5IxfIRrp-tJpioDNHAg-SFkUR2-gck0gMq_Njoj9UQSE1QH6tcm42NU-kwEho9v2pyaP-qV8Cpzvre5ZT-bz2vDEiXyk8SZ-geVQwRlNwxcAKqE_IrXMqvG2i55rqxsgv2tbqk_mlcMuz96FVhUJ63Y1AtGE9-7oCGRuHMX7" width="320" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><span style="font-size: large;">Clique <a href="https://drive.google.com/file/d/1QFPfEZBr7zcO4FKh2t3SfMEqa548IOSU/view?usp=sharing" target="_blank">aqui</a> para baixar o texto (formato PDF).</span></div></div></div><p></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-81116522659872697482022-09-09T10:18:00.004-07:002022-09-09T10:37:44.930-07:00Uma Teoria Simples sobre a Corrupção (Hans Sennholz)<div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEh_S6Pk2l4Iueq3BlroQo1C3Cgb3yzAxi7ItiOr9P-X-tudRzx0qEabAns57LDg64laBQArpUqjKChJyiJwplXeTxYFl8dLBevpblP_TpZM1Q-usAQKAYsvAJBCZgLDCdxiAkRpV1Yte8ITBpbX63Nq4EK8MatbLPZg3GCFRX-HMJ9wY7gzqBmcN0a4" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="879" data-original-width="1080" height="240" src="https://blogger.googleusercontent.com/img/a/AVvXsEh_S6Pk2l4Iueq3BlroQo1C3Cgb3yzAxi7ItiOr9P-X-tudRzx0qEabAns57LDg64laBQArpUqjKChJyiJwplXeTxYFl8dLBevpblP_TpZM1Q-usAQKAYsvAJBCZgLDCdxiAkRpV1Yte8ITBpbX63Nq4EK8MatbLPZg3GCFRX-HMJ9wY7gzqBmcN0a4" width="295" /></a></div></div><p><a href="https://blogger.googleusercontent.com/img/a/AVvXsEj54UVqpOcTPJdud1ojWrQMg1brSxahf7ufu7TYeAlxfefS9RwXvzzqEHlRy8SOblsN4_HyLNC-AYyHa5Aju4KMvhjXF0Nq5vt5jSH5HjuZZ_JA-Af72UZnLudlDnY-Cr6QZo162-UMQIjvXvXSnmPpf74Q-ExZdm2AWwJpP8Lm74B4CDlgNSPSYRl2" style="margin-left: 1em; margin-right: 1em; text-align: center;"></a></p><p></p><div class="separator" style="clear: both; text-align: center;"><span style="font-family: Garamond, serif; line-height: 107%;"><span style="font-size: large;"><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;">“Não quero silenciar um
exemplo moderno: o de Alexandre VI, que na sua vida só fez enganar as pessoas.
Nunca pensou em outra coisa; e sempre encontrou oportunidade para isso. Ninguém
jamais afirmou com tanta convicção — e prometendo com tanto vigor cumpriu tão
pouco o prometido. Ele, porém, sempre se beneficiou com a mentira, pois
conhecia muito bem essa arte.”</p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="text-align: center;">—
Maquiavel, </span><i style="text-align: center;">O Príncipe</i><span style="text-align: center;">, cap. 18 </span></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="text-indent: 36pt;">“As pessoas são tão pouco argutas, inclinando-se de tal modo às necessidades imediatas, que quem quiser enganá-las encontrará sempre quem se deixe enganar.”</span></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="text-align: center;">— Maquiavel,</span><span style="text-align: center;"> </span><i style="text-align: center;">O Príncipe</i><span style="text-align: center;">, cap. 18</span></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;">“Além disso, em função do fato de a Constituição
explicitamente conceder a ‘livre entrada’ no aparato estatal — qualquer pessoa
pode se tornar um membro do Congresso, um juiz do Tribunal Supremo ou o
presidente —, foi diminuída a resistência contra as invasões de propriedade
pelo estado; como resultado da “livre competição política”, toda a estrutura
moral da sociedade foi distorcida, e mais e mais indivíduos maus ascenderam ao
topo. Pois liberdade de entrada e livre competição nem sempre são coisas boas. Liberdade
de entrada e livre concorrência na produção de <i>bens</i> é algo positivo; mas
livre concorrência na produção de <i>males</i> é algo negativo. Por exemplo,
liberdade de entrada no ramo de assassinatos, de roubos, de falsificações e
mentiras não é algo bom; é algo pior que péssimo. Entretanto, é exatamente isso
que fica instituído pela livre competição política, <i>i.e.</i>, pela
democracia.<o:p></o:p></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36.0pt;">(...)<o:p></o:p></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36.0pt;">Pior ainda: (...) os
politicamente talentosos, que têm pouca ou nenhuma inibição contra tomar a
propriedade alheia e mandar nos outros, possuem uma vantagem clara sobre
aqueles que têm tais escrúpulos. Ou seja, a livre competição política favorece
os talentos políticos agressivos (portanto, perigosos) em vez dos defensivos
(portanto, inofensivos), conduzindo, assim, ao cultivo e à perfeição das
peculiares habilidades da demagogia, da fraude, da mentira, do oportunismo, da corrupção
e do suborno. Em consequência, a entrada e o sucesso no governo se tornarão cada
vez mais impossíveis para qualquer pessoa que tenha inibições morais contra os
atos de mentir e roubar. Então, ao contrário dos monarcas hereditários, os congressistas,
os presidentes e os juízes do Tribunal Supremo não adquirem — aliás, nem podem
adquirir — as suas posições acidentalmente (por acaso).”</p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36.0pt;"><span style="line-height: 107%; text-align: center; text-indent: 36pt;">— </span><span style="line-height: 107%; text-align: center; text-indent: 36pt;">Hans-Hermann
Hoppe, <i>Democracia </i>— <i>o Deus que Falhou</i>, capítulo 13</span></p></span></span></div><div class="separator" style="clear: both; text-align: center;"><span style="font-size: large;">Clique <a href="https://drive.google.com/file/d/1Vx4cmV7RRcXt29f6hdHLY-6na7SJhoaH/view?usp=sharing" target="_blank">aqui</a> para baixar o texto (formato PDF).</span></div><p></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-54051814990435396892022-09-04T13:41:00.001-07:002022-09-04T13:41:57.206-07:00Como Ocorreu o Milagre Econômico Alemão no Pós-guerra (Hans Sennholz)<p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEgVYZ6N3gGrbkOmsCGr0rAKBuWy2Yoai8CkbDlFcvt-33j2JamE8Jf6S_NAHTEAK50yQGTIhLz90mTZW8ELDrZfPnfwd7uFHvwoBnCpykSZbHECJoOJjcaKCQ6YvpBjbWImWWTRwcmlsrVcRy4SL8rcqeogaKFAfQ4GME1YR8srmDCmRRdYVsvZU22B" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="396" data-original-width="704" height="225" src="https://blogger.googleusercontent.com/img/a/AVvXsEgVYZ6N3gGrbkOmsCGr0rAKBuWy2Yoai8CkbDlFcvt-33j2JamE8Jf6S_NAHTEAK50yQGTIhLz90mTZW8ELDrZfPnfwd7uFHvwoBnCpykSZbHECJoOJjcaKCQ6YvpBjbWImWWTRwcmlsrVcRy4SL8rcqeogaKFAfQ4GME1YR8srmDCmRRdYVsvZU22B=w400-h225" width="400" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEhMgjc3fCuZ-t0dUDmnNVMZCWqLVLYK-OtZpNMI5DN6tXc-d5MTT84cFvbvs_BGJdELkjJnoxRYuslrLWQY6bRDmbcDRRgq-P4oqnH5WEhpYNyYUnSNB5mpxKwUroVQvzPZBDkpIc9TCcDLLhlBYYExSr4z8nW4n_iU9xXunslz1a2Rxyym_PxOBbVj" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="789" data-original-width="762" height="400" src="https://blogger.googleusercontent.com/img/a/AVvXsEhMgjc3fCuZ-t0dUDmnNVMZCWqLVLYK-OtZpNMI5DN6tXc-d5MTT84cFvbvs_BGJdELkjJnoxRYuslrLWQY6bRDmbcDRRgq-P4oqnH5WEhpYNyYUnSNB5mpxKwUroVQvzPZBDkpIc9TCcDLLhlBYYExSr4z8nW4n_iU9xXunslz1a2Rxyym_PxOBbVj=w387-h400" width="387" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEiD21qDATapKiq4ym3d9LB6AO8Ow_1-S3i3YSCLNdKRlgJBcJLklIPEz5ZvD4UBlPoYY5baL25Yo9UtJiGmGqE9Fqdwv4UDpxOP9_rx2m2OhYGetpxKi9W2G6IflYiiZVa_gi4DSUaDHjzHPA0Re8Ge3iJuKbeS-ZVJMTSB_NM1vSRijOcpuWaykj88" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="800" data-original-width="705" height="400" src="https://blogger.googleusercontent.com/img/a/AVvXsEiD21qDATapKiq4ym3d9LB6AO8Ow_1-S3i3YSCLNdKRlgJBcJLklIPEz5ZvD4UBlPoYY5baL25Yo9UtJiGmGqE9Fqdwv4UDpxOP9_rx2m2OhYGetpxKi9W2G6IflYiiZVa_gi4DSUaDHjzHPA0Re8Ge3iJuKbeS-ZVJMTSB_NM1vSRijOcpuWaykj88=w353-h400" width="353" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEiUal38mSIBqguO3xyz9VCg_Gy3El47lA22Oc6d24TEvrH97JmPh1PustrLE1kRGh0tel8s_A0qe1FMzvCF4_Sr37RP5-lg-Aqpl7aZyLm-Qq4Ay84qJaY8atw5pK19aSgP6sfJbLwc1N8wqCEtKPezs-njGdKY5m3q-cqQhtjP1RHgm_2wXUhGJ7pi" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="1254" data-original-width="1080" height="400" src="https://blogger.googleusercontent.com/img/a/AVvXsEiUal38mSIBqguO3xyz9VCg_Gy3El47lA22Oc6d24TEvrH97JmPh1PustrLE1kRGh0tel8s_A0qe1FMzvCF4_Sr37RP5-lg-Aqpl7aZyLm-Qq4Ay84qJaY8atw5pK19aSgP6sfJbLwc1N8wqCEtKPezs-njGdKY5m3q-cqQhtjP1RHgm_2wXUhGJ7pi=w345-h400" width="345" /></a></div><br /></div><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEg_cdG9iDTIe5bup70fKio_Xpl2EBA7s7v_GmL4KDQGIbltQEp3JW2WcrSn1Azv-UyMnrIAHrYemczUaG_SxEGHDdnXZqLPih6Y7sBstZvYgnypoREsYvgquvzbRvYcXHloiw0vIk0Ant8WvA7Ne22kMJdskWoXMsX5SUc4-vMJspky72-1wtB1UaKz" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="1767" data-original-width="1079" height="400" src="https://blogger.googleusercontent.com/img/a/AVvXsEg_cdG9iDTIe5bup70fKio_Xpl2EBA7s7v_GmL4KDQGIbltQEp3JW2WcrSn1Azv-UyMnrIAHrYemczUaG_SxEGHDdnXZqLPih6Y7sBstZvYgnypoREsYvgquvzbRvYcXHloiw0vIk0Ant8WvA7Ne22kMJdskWoXMsX5SUc4-vMJspky72-1wtB1UaKz=w245-h400" width="245" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><span style="font-size: large;">Clique <b><a href="https://drive.google.com/file/d/1Oou9EeWzy6Wrm7E4IyYAAV3KWNrOAqqn/view?usp=sharing" target="_blank">aqui</a></b> para baixar o artigo (formato PDF).</span></div></div></div></div><p></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-30074512786881081902022-08-18T14:11:00.004-07:002022-08-18T14:11:30.712-07:00O Pensamento Econômico na Grécia Antiga (Jesús Huerta de Soto)<p><br /></p><p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEj9Zz_lqsc04pHp9wCM4e7klXjoPdbfudnLXw1pmv1m6Yx4xTOGW_E4NuhnK7RIc1UT-1MNFDeqCecbV1ZvW7MS7VOoS8kO17xutISJrO_MGd7h2TqW5Ms6w1IbEPgek7DIFQU7xucQ7_4sJuY_lUJI5JkHUKHR1kVpCaQdWPaAuL1B7oEmANOFsaHu" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="900" data-original-width="1200" height="240" src="https://blogger.googleusercontent.com/img/a/AVvXsEj9Zz_lqsc04pHp9wCM4e7klXjoPdbfudnLXw1pmv1m6Yx4xTOGW_E4NuhnK7RIc1UT-1MNFDeqCecbV1ZvW7MS7VOoS8kO17xutISJrO_MGd7h2TqW5Ms6w1IbEPgek7DIFQU7xucQ7_4sJuY_lUJI5JkHUKHR1kVpCaQdWPaAuL1B7oEmANOFsaHu" width="320" /></a></div><p></p><p><span style="font-size: large;">Clique <a href="https://drive.google.com/file/d/105gXaRJrX1Af18DNr00GTWuhGDWXrRyp/view?usp=sharing" target="_blank">aqui</a> para baixar o texto (formato PDF).</span></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-59176337295716056672022-08-09T13:44:00.003-07:002022-08-09T13:48:29.934-07:00Desigualdade Social, a Solução Final (Roberto Rachewsky)<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEh7CEbLYxCM78aFMMXGMsAwPgsBqeOJ7DVyZghUvDKcx9Stc0dEWxcmAWqmoCkztPl5n8SW8-ZxA0f8xIY46MyaqdDL6zmbbRUy-fMLoDRAA9VSmVdFfk22YZW4qwrgIU935omyg8nB4FN_Fj2j_NnwMs0Mekvlfgqsee8DcJCODiJrmft7zHoXqPy8" style="margin-left: 1em; margin-right: 1em;"><span style="font-size: medium;"><img alt="" data-original-height="699" data-original-width="1160" height="241" src="https://blogger.googleusercontent.com/img/a/AVvXsEh7CEbLYxCM78aFMMXGMsAwPgsBqeOJ7DVyZghUvDKcx9Stc0dEWxcmAWqmoCkztPl5n8SW8-ZxA0f8xIY46MyaqdDL6zmbbRUy-fMLoDRAA9VSmVdFfk22YZW4qwrgIU935omyg8nB4FN_Fj2j_NnwMs0Mekvlfgqsee8DcJCODiJrmft7zHoXqPy8=w400-h241" width="400" /></span></a></div><div class="separator" style="clear: both; text-align: center;">(Clique na imagem para melhor visualização.)</div><div class="separator" style="clear: both; text-align: center;"><p align="center" class="MsoNormal" style="line-height: 115%;"><span><i><span style="font-family: Garamond, serif; line-height: 115%;">Texto
publicado em 08.08.2022 no jornal </span></i><span style="font-family: Garamond, serif; line-height: 115%;">Zero Hora</span><i><span style="font-family: Garamond, serif; line-height: 115%;">, de Porto Alegre, RS<o:p></o:p></span></i></span></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><span><span style="font-family: Garamond, serif; line-height: 115%;">Ninguém tratou a desigualdade social
melhor que Pol Pot, líder do Khmer Vermelho, grupo revolucionário comunista que
governou o Camboja de 1975 a 1979. De família rica, Pol Pot estudou em Paris,
onde conheceu as ideias de Rousseau, Marx, Stalin e Mao. Com Kropotkin,
anarquista russo, aprendeu sobre o igualitarismo, doutrina na qual Pol Pot se
especializou, levando-a às últimas consequências. Para impedir que os
indivíduos mais qualificados, criativos, produtivos, ambiciosos se
sobressaíssem na sociedade cambojana, não hesitou em usar a violência
extrema. </span><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></span></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span><span style="font-family: Garamond, serif; line-height: 115%;">A natureza racional do homem demanda
que os indivíduos sejam livres para agirem de acordo com o seu próprio
julgamento para desenvolverem habilidades, adquirirem conhecimento e bens,
interagirem com os demais para a maximização de potencialidades e oportunidades
individuais no contexto social, buscando satisfazerem o seu
autointeresse. </span><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></span></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span><span style="font-family: Garamond, serif; line-height: 115%;">Pol Pot sabia que homens livres não são
iguais. Por isso, evacuou cidades, transferindo os seus habitantes para áreas
rurais para trabalharem com monocultura agrícola como escravos do seu governo.
Os cambojanos foram destituídos dos seus bens; famílias foram dissolvidas; e
cientistas, professores, clérigos, adultos pertencentes à classe média foram
considerados corruptos e mortos. Pessoas com problemas de visão tiveram os seus
óculos confiscados para que ninguém enxergasse melhor que os outros. Quem
demonstrasse possuir conhecimento superior era sumariamente exterminado.</span><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></span></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span><span style="font-family: Garamond, serif; line-height: 115%;">Os comunistas tinham ciência de que
para acabar com a desigualdade social, natural à espécie humana, era preciso
transformar cada indivíduo num animal irracional, incapaz de adquirir e usar
conhecimento, de criar e produzir riqueza. No Camboja, a igualdade social foi
conquistada na forma de cadáveres empilhados aos milhões em montanhas de ossos.</span><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></span></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span><span style="font-family: Garamond, serif; line-height: 115%;">Seres humanos não são iguais. Onde
liberdade e propriedade existem, como no capitalismo, os resultados produzidos
pelos indivíduos sempre serão desiguais. O capitalismo não acaba com a
desigualdade social porque não é um sistema desumano. O que acaba no
capitalismo é a miséria, este, sim, problema real da humanidade, mas que vem
sendo reduzido desde a Revolução Industrial.</span></span></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-family: Garamond, serif; text-indent: 36pt;">Quando vierem lhe falar de desigualdade
social, pergunte: “Já ouviste falar em Pol Pot?”. Se a resposta for não,
recomende </span><i style="font-family: Garamond, serif; text-indent: 36pt;">Gritos do Silêncio</i><span style="font-family: Garamond, serif; text-indent: 36pt;">, título em português do filme </span><i style="font-family: Garamond, serif; text-indent: 36pt;">The
Killing Fields</i><span style="font-family: Garamond, serif; text-indent: 36pt;">, os campos da morte, em tradução literal.</span></p>
<p class="MsoNormal"><b style="text-align: justify; text-indent: 36pt;"><br /></b></p><p class="MsoNormal"><b style="text-align: justify; text-indent: 36pt;">***</b></p><p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 35.4pt;"><b><span style="font-family: Garamond, serif;">Comentário </span></b><b style="text-indent: 47.2px;"><span style="font-family: Garamond, serif;">na seção dos leitores </span></b><b style="text-indent: 35.4pt;"><span style="font-family: Garamond, serif;">de João Carlos Stona Heberle, um médico de Cruz Alta (RS), no dia seguinte à publicação do texto acima no jornal <i>Zero Hora</i>,
de Porto Alegre (RS):</span></b></p><p style="line-height: 115%; margin-bottom: 0cm; margin-left: 35.4pt; margin-right: 0cm; margin-top: 0cm; margin: 0cm 0cm 0cm 35.4pt; text-align: justify; text-indent: 35.4pt;"><b><span style="font-family: Garamond, serif;"> </span></b></p><p style="line-height: 115%; margin-bottom: 0cm; margin-left: 35.4pt; margin-right: 0cm; margin-top: 0cm; margin: 0cm 0cm 0cm 35.4pt; text-align: justify; text-indent: 35.4pt;"><span style="font-family: Garamond, serif;">O texto “Desigualdade
social, a solução final”, de Roberto Rachewsky (ZH, 8/8), cita Pol Pot (um
déspota) como “exemplo” de comunismo e diz que o que acaba no capitalismo é a
miséria! Em que país vive Roberto? Pois no nosso Brasil capitalista, 33 milhões
de pessoas estão passando fome. Programas como Fome Zero, Minha Casa Minha Vida
e o Prouni, da dita “esquerda”, esses sim, diminuem a desigualdade social.</span><o:p></o:p></p><p style="line-height: 115%; margin-bottom: 0cm; margin-left: 35.4pt; margin-right: 0cm; margin-top: 0cm; margin: 0cm 0cm 0cm 35.4pt; text-align: justify; text-indent: 35.4pt;"><span style="font-family: Garamond, serif;"> </span></p><p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 35.4pt;"><b><span style="font-family: Garamond, serif;">O livre
mercado — o capitalismo — envolve propriedade privada, trocas voluntárias,
oferta e demanda, sistema de preços, empreendedores servindo
consumidores/usuários; irrestrita liberdade de entrada no processo de mercado;
processo de poupança, investimento e acumulação de capital. Nada tem a ver com
socialismo (propriedade estatal de tudo e de todos) e intervencionismo
(economia de compadrio).</span><o:p></o:p></b></p><p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 35.4pt;"><b><span style="font-family: Garamond, serif;">O estado
é apenas um aparato de coerção, de violência, de agressão. Ele não produz
riqueza. Ele somente a confisca e a redistribui, ficando para si — <i>i.e.</i>,
para os<i> </i>políticos e os burocratas que o comandam — a maior parte desse
esbulho. Tais “programas sociais” somente servem para polir a imagem do Bandido
Estacionário e obter apoio político-eleitoral.<o:p></o:p></span></b></p><p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 35.4pt;"><b><span style="font-family: Garamond, serif;">O
estado brasileiro simplesmente não permite o capitalismo genuíno no país. Não
existe verdadeiro livre mercado por aqui; o intervencionismo estatal domina tudo.
Se houvesse genuíno capitalismo por aqui, o nível de miséria seria muitíssimo <i>menor</i>.</span></b></p><p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 35.4pt;"><b><span style="font-family: Garamond, serif;">O
socialismo significa que todos os meios de produção estão sob o controle do
estado. Na prática, o estado torna-se dono de tudo e de todos. A força de
trabalho dos indivíduos é também um meio de produção; o socialismo, então,
significa que a força de trabalho das pessoas pertence ao estado, não a elas. </span></b><span style="font-family: Garamond, serif;">N<b>a
realidade, as <i>próprias</i> pessoas pertencem ao estado.<o:p></o:p></b></span></p><p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 35.4pt;"><b><span style="font-family: Garamond, serif;">O
médico chamou Pol Pot de “um déspota”, dando a entender que o socialismo do
Khmer Vermelho foi apenas “despotismo”, “ditadura”, “opressão”, deixando,
portanto, de configurar o “verdadeiro socialismo” — então todas as atrocidades
do socialismo nas diversas regiões do planeta aconteceram apenas porque o
socialismo foi aplicado de maneira errada. O socialismo, porém, dá o poder
absoluto a um grupelho de políticos e burocratas. E o poder absoluto resulta em
atrocidades absolutas. (O socialismo, ademais, prega o extermínio de quem seja
inimigo do proletariado e da revolução — “burgueses”, por exemplo.)<o:p></o:p></span></b></p><p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 35.4pt;"><b><span style="font-family: Garamond, serif;">Esse
número de pessoas que o médico diz que estão passando fome — trinta e três milhões
— é apenas propaganda esquerdista.<o:p></o:p></span></b></p><p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 35.4pt;"><b><span style="font-family: Garamond, serif;">Finalizo:
A “igualdade plena” só é possível por meio de ilimitada violência para rebaixar
os seres humanos a um denominador comum: escravos animalescos.</span></b></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><br /></p></div>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-16199172424416125192022-07-28T15:11:00.007-07:002022-07-28T15:11:54.029-07:00A Grande Ameaça para a Liberdade e a Civilização Vem da Esquerda (Lew Rockwell)<p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEgqLRViSLtQEmAlQZAxEt6UEyDm80-lAn6OjyJoYTv02yo1lonudnjAL3YiXV6pggvYsWzF-lmcXsfbI_uLlBU5KwkPpcFEyJ7wsj83hH1N9Xai2fuN-CV2vkvnwgxxH7AemBSunTg2kij_VR_oypI0cvJZkieBrjyNGkNWXKEFIdOC9pcVWH2LehyE" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="1027" data-original-width="1280" height="321" src="https://blogger.googleusercontent.com/img/a/AVvXsEgqLRViSLtQEmAlQZAxEt6UEyDm80-lAn6OjyJoYTv02yo1lonudnjAL3YiXV6pggvYsWzF-lmcXsfbI_uLlBU5KwkPpcFEyJ7wsj83hH1N9Xai2fuN-CV2vkvnwgxxH7AemBSunTg2kij_VR_oypI0cvJZkieBrjyNGkNWXKEFIdOC9pcVWH2LehyE=w400-h321" width="400" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><span style="font-size: x-large;">Clique </span><a href="https://drive.google.com/file/d/1ZJ4-qfdOI02Q--zxHVGOJSd-RA4iTEE8/view?usp=sharing" style="font-size: x-large;" target="_blank">aqui</a><span style="font-size: x-large;"> para baixar o texto (formato PDF).</span><p></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-10458976893853732332021-12-01T07:51:00.004-08:002022-09-11T15:42:18.290-07:00Sensação de Segurança (Roberto Rachewsky)<p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">“É difícil imaginar um meio mais estúpido ou mais perigoso de efetuar decisões que colocar o poder de tomar decisões nas mãos de pessoas que nenhum preço pagam por estarem erradas.”</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">— Thomas Sowell</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span class="Apple-tab-span" style="white-space: pre;"><span style="font-family: georgia; font-size: large;"> </span></span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="font-family: georgia; font-size: large;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">A tragédia da boate Kiss — ocorrida em 27 de janeiro de 2013 na cidade de Santa Maria (região central do Rio Grande do Sul, uma unidade federativa do estado brasileiro) —, que assassinou 242 pessoas e trouxe problemas de saúde e traumas psicológicos para muitas outras, demonstra a perversidade da citação acima. Roberto Rachewsky, no seu artigo </span><span style="background-color: transparent; color: black; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Sensação de Segurança</span><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">, explica:</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;"> </span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">O vício de nos evadirmos da realidade cobra sempre o seu preço.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">Muitas vezes, impõe perdas incalculáveis, como ocorreu agora, em Santa Maria, com mais uma tragédia causada pela desídia.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">Uma lição deve ser aprendida de uma vez por todas:</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;"><br /></span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 72pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: italic; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">O estado não pode ser o fiscal da segurança. Nem das pessoas, nem das propriedades, pois nunca perde nada em caso de sinistro.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;"><b style="font-weight: normal;"><span style="font-family: georgia; font-size: large;"><br /></span></b></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">Apenas seguradoras privadas poderiam atestar se um determinado local tem a devida e esperada segurança para o público que o frequenta.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">Não podemos nos guiar apenas pela sensação de segurança porque um determinado estabelecimento cumpriu com a burocracia estatal para funcionar. </span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">Devemos nos certificar de que estamos em um lugar efetivamente seguro e de que, em caso de alguma ocorrência com danos pessoais ou materiais, seremos devidamente indenizados por seus responsáveis.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">Ocorrendo qualquer sinistro, os prejuízos das vítimas serão cobertos pela empresa seguradora.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">Para minimizar a possibilidade de que tenha de arcar com sinistros inesperados, qualquer seguradora responsável incentivará ou exigirá que condições ótimas de redução de riscos sejam aplicadas, o que trará, efetivamente, maior segurança às pessoas e às coisas que a elas pertencem.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">Alvarás ou laudos emitidos por órgãos do governo servem apenas para assegurar o recolhimento de taxas pelo poder público. Quando instados a assumir responsabilidade civil, pecuniária ou criminal, não demoram para se esquivar. Muitas vezes, culpando as próprias vítimas.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">O livre mercado e as instituições privadas podem e devem ser as fiadoras das condições oferecidas ao público por estabelecimentos como a casa noturna de Santa Maria, através de contratos de seguro bem feitos.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-left: 36pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">Imaginarmos que o estado se responsabilizará pelos danos que causar, seja por omissão ou por incompetência, nada mais é do que seguirmos agindo sob o efeito do vício da negação da realidade.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 700; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;"> </span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">Portanto, os custos e os prejuízos de todas as “políticas públicas” praticadas pelo estado são transferidos para a população.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">Os governantes — os políticos e os burocratas — podem errar e explorar à vontade, pois eles não são quem arcará com os custos e os prejuízos dos seus fiascos e das suas depredações.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="font-family: georgia; font-size: large;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">Em relação ao estado, aplica-se a ideia da irresponsabilidade (resumida assim: </span><span style="background-color: transparent; color: black; font-style: italic; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;">the state can do no wrong</span><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"> — “o estado não comete erros”), não obstante todas as teorias jurídicas sobre o tema e todos os dispositivos legislativos (de “direito constitucional”, de “direito administrativo” e de “direito penal”) que buscam tornar os agentes estatais responsáveis pelas suas decisões e ações.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">A natureza predatória e burocrática do estado jamais pode mudar. Chega a ser cômico o argumento de que basta “colocar no poder as pessoas certas” e “realizar reformas políticas” para o estado “operar corretamente”.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">Ademais, ocorre clássica situação de conflito de interesses. O estado julga o estado. O estado julga a si mesmo; e a probabilidade de que alguém julgue contra si próprio é quase nula.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;"></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;">O Ministério Público não acusou a si mesmo no caso da Boate Kiss; nem acusou outros agentes estatais graúdos.</span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;"><br /></span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt; text-align: justify; text-indent: 36pt;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;"></span></span></p><div class="separator" style="clear: both; text-align: center;"><span style="background-color: transparent; color: black; font-style: normal; font-variant: normal; font-weight: 400; text-decoration: none; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiwOBz65xjnX1A8YKzpY4qUyikAtHmihCdz4XSfepDnKfymqER8HL0fcKEjhmuEoEFoYCRQE-WUivbuVXK_yeJ4DA20DSMQ00tPKNYVSaM3KVU0IGgmQaIR1SYE1nqsurg5nbEY7wkgIas/" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="926" data-original-width="960" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiwOBz65xjnX1A8YKzpY4qUyikAtHmihCdz4XSfepDnKfymqER8HL0fcKEjhmuEoEFoYCRQE-WUivbuVXK_yeJ4DA20DSMQ00tPKNYVSaM3KVU0IGgmQaIR1SYE1nqsurg5nbEY7wkgIas/" width="249" /></a></span></span></div><p></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-79712338179979250712021-06-04T13:59:00.009-07:002022-07-17T13:40:13.967-07:00Socialismo e Retrocesso da Civilização (Jesús Huerta de Soto)<p><span style="font-size: large;"></span></p><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><span style="font-family: inherit; font-size: large;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhLZp3Giz1DZjV2pOV7YX0jeLS4VDipae3auGWqAn0TjOI89_694tLk7xN3ZGTvzFoBnj2_U4rjS36X9tWTJq4UjUGJM4BSmN_Z1KrJbjFco-3zLGWzNborTOs9GMrqBvj5sViMhyphenhyphenfzW7k/" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="634" data-original-width="1286" height="158" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhLZp3Giz1DZjV2pOV7YX0jeLS4VDipae3auGWqAn0TjOI89_694tLk7xN3ZGTvzFoBnj2_U4rjS36X9tWTJq4UjUGJM4BSmN_Z1KrJbjFco-3zLGWzNborTOs9GMrqBvj5sViMhyphenhyphenfzW7k/" width="320" /></a></span></div><div class="separator" style="clear: both; text-align: center;"><span style="font-family: inherit; font-size: large;">(Clique na imagem para melhor visualização.)</span></div><div class="separator" style="clear: both; text-align: center;"><span style="font-family: inherit; font-size: large;"><br /></span></div><div class="separator" style="clear: both; text-align: center;"><span style="font-family: georgia; font-size: large;"><span id="docs-internal-guid-7f8b7af4-7fff-e676-126b-24de51d7e506"><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;"><span style="background-color: white; font-variant-east-asian: normal; font-variant-numeric: normal; vertical-align: baseline; white-space: pre-wrap;"><b>“A maravilhosa civilização da antiguidade desapareceu porque não soube ajustar o seu código moral e o seu sistema jurídico às exigências da economia de mercado. Uma ordem social está fadada a desaparecer se as ações necessárias ao seu bom funcionamento são rejeitadas pelos padrões morais, são consideradas ilícitas pelas normas do país e são punidas pelos juízes e pela polícia. O Império Romano se esfacelou por ter ignorado o liberalismo e o sistema de livre iniciativa. O intervencionismo e o seu corolário político, o governo autoritário, destruíram o poderoso império — da mesma forma como necessariamente desintegrarão e destruirão, sempre, qualquer entidade social.”</b></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;"><span style="background-color: white; font-variant-east-asian: normal; font-variant-numeric: normal; vertical-align: baseline; white-space: pre-wrap;"><b>— Ludwig von Mises</b></span></p></span></span></div><div class="separator" style="clear: both; text-align: center;"><span style="font-family: georgia; font-size: large;"><br /></span></div><div class="separator" style="clear: both; text-align: center;"><span id="docs-internal-guid-046e49c3-7fff-3d3c-1e09-a5f7c596ae4a"><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;"><span style="font-variant-east-asian: normal; font-variant-numeric: normal; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;"><b>“Socialismo es todo sistema de agresión institucional contra el libre ejercicio de la acción humana o función empresarial.”</b></span></span></p><p dir="ltr" style="line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;"><span style="font-variant-east-asian: normal; font-variant-numeric: normal; vertical-align: baseline; white-space: pre-wrap;"><span style="font-family: georgia; font-size: large;"><b>— Jesús Huerta de Soto</b></span></span></p><p dir="ltr" style="font-family: inherit; line-height: 1.38; margin-bottom: 0pt; margin-top: 0pt;"><span style="font-variant-east-asian: normal; font-variant-numeric: normal; vertical-align: baseline; white-space: pre-wrap;"><span style="font-size: large;"><b><br /></b></span></span></p></span></div></div><p></p><p><span style="font-family: inherit; font-size: large;">Clique <a href="https://drive.google.com/file/d/1RuFrB7CAk8wRJXIda1UhaJiIgo37JSPd/view?usp=sharing" target="_blank">aqui</a> para <span>baixar o texto (formato PDF).</span></span></p><p><span style="font-size: large;"><span style="font-family: inherit;">Versão em <a href="https://mises.org/library/socialism-and-decivilization" target="_blank">inglês</a>.</span></span></p><p><span style="font-size: large;"><span style="font-family: inherit;">Versão em <a href="https://mises.org/es/library/socialismo-y-descivilizacion" target="_blank">espanhol</a>.</span></span></p><p><span style="font-size: large;"><span style="font-family: inherit;">Leia também: </span></span></p><p><span style="font-size: large;"><span style="font-family: inherit;"><a href="https://eaefl.blogspot.com/2015/08/observacoes-sobre-as-causas-do-declinio.html">https://eaefl.blogspot.com/2015/08/observacoes-sobre-as-causas-do-declinio.html</a></span></span></p><p><span style="font-size: large;">Livro mencionado pelo autor: <a href="https://drive.google.com/file/d/1edGmxEfILDouPQmsUuQOHaK-m44RweMY/view?usp=sharing" target="_blank">Socialismo, Cálculo Económico y Función Empresarial</a>.</span></p>Unknownnoreply@blogger.com1tag:blogger.com,1999:blog-323946075758818465.post-84206487608657326962021-05-17T14:56:00.002-07:002022-06-28T08:32:09.005-07:00Evitem ter Hayek como referência pró-liberdade<p><span style="font-family: georgia; font-size: large;"> Leiam estes dois textos:</span></p><p><span style="font-family: georgia; font-size: large;">(1) <a href="https://drive.google.com/file/d/1nbS7fAmSBGKQvnELcxQVRxlbiwVqL_cM/view" target="_blank">Mises contra Hayek <span style="white-space: pre-wrap;">— o socialismo é um problema de propriedade ou de conhecimento?</span></a></span></p><p><span style="font-family: georgia; font-size: large;">(2) <a href="https://drive.google.com/file/d/1qsn5nFNq4B5qP82tA9aChMBTf0ROmkoE/view?usp=sharing" target="_blank">Por que Mises <span style="white-space: pre-wrap;">— e não Hayek</span></a></span></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-58037886758750971922021-05-17T13:22:00.005-07:002022-07-06T14:42:50.114-07:00Os Intocáveis (Patrícia Bonafé Turmina)<p><span style="font-size: large;"> </span></p><div class="separator" style="clear: both; text-align: center;"><span style="font-size: large;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjsCMxdtYKajTIL_AGWqVAocAlvapcntOOuMJVIxWEzt0pFIE8SDC4aJQVVTbbnx_Ge1W1nJdDMD8IePt12eLeavjjYOkwfrSM7cWtTWb-J_-GgJbtZx2KNaEsfsQSzKBQFMLCNLfsvWLI/" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="872" data-original-width="884" height="432" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjsCMxdtYKajTIL_AGWqVAocAlvapcntOOuMJVIxWEzt0pFIE8SDC4aJQVVTbbnx_Ge1W1nJdDMD8IePt12eLeavjjYOkwfrSM7cWtTWb-J_-GgJbtZx2KNaEsfsQSzKBQFMLCNLfsvWLI/w437-h432/4+FORMAS+DE+SE+GASTAR+DINHEIRO.png" width="437" /></a></span></div><p></p><p><br /></p><p><span style="font-size: large;"><i style="text-align: center;"><span style="font-family: Garamond, serif; line-height: 115%;">Texto publicado em 20.08.2020</span></i></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span style="font-family: Garamond, serif; line-height: 115%;"><o:p><span style="font-size: large;"> </span></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-size: large;"><span style="color: black; font-family: Garamond, serif; line-height: 115%;">No Brasil, foram desembolsados R$ 928
bilhões para pagar servidores públicos em 2019. Isso significa que, só ao
funcionalismo, cada brasileiro pagou em média R$ 4.440 </span><span style="color: black; font-family: Garamond, serif; line-height: 115%;">— </span><span style="color: black; font-family: Garamond, serif; line-height: 115%;">sem contar outras despesas e investimentos. Esse gasto, por exemplo, é o
dobro do investimento na educação e 3,5 vezes o investimento na saúde.</span><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-size: large;"><span style="color: black; font-family: Garamond, serif; line-height: 115%;">Mais do que o funcionalismo comum, os
cargos públicos de alto escalão costumam remunerar muito melhor que a
iniciativa privada. Isso porque o Estado pode se dar a um luxo que as empresas
privadas jamais poderão: ter prejuízos constantes e contínuos e continuar
gastando. Empresas deficitárias e pouco competitivas quebram, mas, no caso do
Estado, há sempre um benfeitor que arca com o preço abusivo e o prejuízo: você.</span><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-size: large;"><span style="color: black; font-family: Garamond, serif; line-height: 115%;">Desviar o foco do brasileiro da gravidade
da crise orçamentária é a especialidade do governo. Não surpreende, já que quem
julga o corte de gastos é justamente quem mais se beneficia do sistema
deficitário. As mudanças mais cruciais para uma reforma estruturante não são
sequer comentadas, pois o compromisso assumido pelo Estado com os servidores
mais onerosos é intocável. Só não é intocável o bolso do cidadão.</span><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-size: large;"><span style="color: black; font-family: Garamond, serif; line-height: 115%;">É comum, por exemplo, que os três
poderes concordem que os salários dos professores deveriam ser maiores. Mas
você não verá os <i>bon vivants</i> do alto escalão do Executivo, do Legislativo
e do Judiciário dispostos a abrirem mão dos seus salários de R$ 20 mil, R$ 30
mil, R$ 40 mil (e mais) </span><span style="color: black; font-family: Garamond, serif; line-height: 115%;">— </span><span style="color: black; font-family: Garamond, serif; line-height: 115%;">ou dos seus gordos benefícios e
auxílios. A sua sugestão sempre será aumentar a dívida ou a arrecadação.</span><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 36pt;"><span style="font-size: large;"><span style="color: black; font-family: Garamond, serif; line-height: 115%;">O Brasil vende a sua ineficiência fiado
e ainda pendura a conta no nome do cidadão comum </span><span style="color: black; font-family: Garamond, serif; line-height: 115%;">— </span><span style="color: black; font-family: Garamond, serif; line-height: 115%;">que vive no
risco e sabe que o risco é inerente à vida e à evolução. A segurança absoluta
vendida a muitos servidores é incondizente com o estado natural das coisas. O
mundo e a economia têm como essência a instabilidade, mas o Brasil se julga
acima disso. A estabilidade, a onerosidade e os benefícios intocáveis do alto
escalão estão destruindo o orçamento do país. E é o cidadão comum quem segue
carregando o piano na tentativa frustrada de quitar a conta da esquizofrenia
estatal.</span><span style="font-family: Garamond, serif; line-height: 115%;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify;"><span style="font-family: Garamond, serif; line-height: 115%;"><o:p><span style="font-size: large;"> </span></o:p></span></p>
<p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"><b><span style="font-family: Garamond, serif; line-height: 115%;"><span>COMENTÁRIO
MEU:</span></span></b></p><p class="MsoNormal" style="line-height: 115%; text-align: justify; text-indent: 35.4pt;"></p><p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 35.4pt;"><b><span style="color: black; font-family: "Garamond",serif; mso-bidi-font-family: Arial;">Nenhuma
surpresa. Conforme a moderna “Ciência”, quanto maiores forem a tributação, os
gastos estatais, o endividamento estatal e a inflação monetária (<i>i.e.</i>, a
criação de papelzinho colorido e de dígito eletrônico), maior será a
prosperidade...</span><o:p></o:p></b></p>
<p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 35.4pt;"><b><span style="color: black; font-family: "Garamond",serif; mso-bidi-font-family: Arial;">O
estado é apenas uma organização que pratica violações contínuas e
institucionalizadas dos direitos de propriedade num determinado território. O
estado é uma instituição parasitária. Os meios estatais de expropriação mais
comuns são a tributação, a inflação da moeda de curso forçado (aumento da
quantidade de dinheiro em circulação) e as regulamentações (as quais
notadamente restringem o campo de atuação e a iniciativa — <i>i.e.</i>,
restringem a liberdade de entrada no processo de mercado —, beneficiando alguns
em detrimento do resto).</span><o:p></o:p></b></p>
<p style="line-height: 115%; margin: 0cm; text-align: justify; text-indent: 35.4pt;"><b><span style="color: black; font-family: "Garamond",serif; mso-bidi-font-family: Arial;">O
estado configura uma enorme aberração jurídica: julga os casos em que ele
próprio é parte (ou seja, a tendência é clara: julgar em favor de si mesmo).</span></b><b><span style="font-family: "Garamond",serif;"><o:p></o:p></span></b></p><b><span style="font-family: Garamond, serif; line-height: 115%;"><span style="font-size: large;"></span></span></b><p></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-13954631800048449152020-09-30T14:01:00.004-07:002020-09-30T14:01:28.228-07:00Liberdade para contratar, estocar, comprar ou vender (Roberto Rachewsky)<p><span style="font-size: large;"></span></p><div class="separator" style="clear: both; text-align: center;"><span style="font-size: large;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgsb7C9V-4hwZqajSPz0IdWS-x7VP9FxVS_RMhhp1eCupqc6024aBPJ5tT-5iSVWecCz5U4SoPxN0dxoHHBJJF05zaQjluv3f5XJV_RmUduJuFZwCj3DxsZBkDUqbYGqblHMOUL1eXQb-A/" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="721" data-original-width="1200" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgsb7C9V-4hwZqajSPz0IdWS-x7VP9FxVS_RMhhp1eCupqc6024aBPJ5tT-5iSVWecCz5U4SoPxN0dxoHHBJJF05zaQjluv3f5XJV_RmUduJuFZwCj3DxsZBkDUqbYGqblHMOUL1eXQb-A/w400-h240/image.png" width="400" /></a></span></div><span style="font-size: large;"> </span><p></p><p align="center" class="MsoNormal" style="line-height: normal; text-align: center;"><span style="font-size: large;"><i><span style="font-family: Garamond, serif;">Texto
publicado em setembro de 2014</span></i><i><span style="font-family: Garamond, serif;"><o:p></o:p></span></i></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify;"><span style="font-family: Garamond, serif;"><o:p><span style="font-size: large;"> </span></o:p></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">O
Banco Central é a instituição governamental com maior capacidade para
interferir na vida das pessoas, mais até do que a Receita Federal.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">É o
Banco Central que manda imprimir dinheiro, gerando inflação.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">É o
Banco Central que define o preço do dinheiro, a taxa de juros <i>[a taxa SELIC, i.e., a taxa do juro interbancário]</i>, tomando ou dando
empréstimos aos bancos, ao público ou ao governo.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">É o
Banco Central que intervém na taxa de câmbio, definindo o valor do real perante
as moedas estrangeiras. O estoque de moedas estrangeiras fica à disposição do
Banco Central.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">Se o
governo gastar demais e não puder aumentar os impostos, o Banco Central
empresta para o Tesouro Nacional.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">Lembrem-se,
as fontes do Banco Central são aquelas: imprimir dinheiro, tomar empréstimos ou
vender moedas estrangeiras. Ações com um único resultado para a população, a
perda do poder aquisitivo de todos.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">O
governo gasta, o Banco Central ajuda, e a população sofre. Quanto mais pobre
for o cidadão, maior será o seu sofrimento.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">Muitos
economistas defendem a independência do Banco Central, para impedir que o
governo exija ajuda no pagamento dos seus gastos demasiados. Evitando, assim,
inflação, aumento da taxa de juros e desvalorização da moeda.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">Os
fins parecem desejáveis. No entanto, o meio escolhido, a independência do Banco
Central, jamais será implementado consistentemente. Nem as nossas empresas, nem
nós mesmos conseguimos a nossa independência do governo, imaginem um órgão
criado e mantido por ele.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">O que
precisamos, seja com um Banco Central dependente, independente ou inexistente,
é acabar com o curso legal forçado da moeda nacional, que nos obriga a
aceitá-la, sob pena de punição.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">Quem
precisa de independência do Banco Central — e do governo em geral — somos nós.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">Queremos
ter liberdade para contratar, comprar, estocar ou vender o que quisermos, em
qualquer moeda, seja ela estrangeira ou local.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-size: large;"><span style="font-family: Garamond, serif;">A
moeda deve servir apenas como um instrumento a serviço dos homens livres e
produtivos. Um meio de pagamento para facilitar as nossas vidas. É para isso
que o dinheiro serve.</span><span style="font-family: Garamond, serif;"><o:p></o:p></span></span></p>
<p class="MsoNormal" style="line-height: normal; text-align: justify; text-indent: 36.0pt;"><span style="font-family: Garamond, serif;"><span style="font-size: large;">Banco
Central e moeda com curso legal forçado são instrumentos de coerção do governo,
para nos submeter e espoliar.</span></span></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-21942690810789063722020-09-14T12:55:00.000-07:002020-09-14T12:55:05.693-07:00Ditaduras, Relativismo Moral e a Necessidade de Métodos Brutais para Atingir o Socialismo (George Gerald Reisman)<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIOVX4o1JrMPJBogxPys69zogpuHXNtXMT9OqmgOrcBo46vsbjU3Qf2mZFDMqHrTq87jGmwRpagpoDBhw9pZobZEAP9Ykrh-wzNABawq8qXRnhSM0suiLN51oaWYUHL-7m5hbo5wNz3fY/s800/Augusto+Pinochet.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="450" data-original-width="800" height="281" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIOVX4o1JrMPJBogxPys69zogpuHXNtXMT9OqmgOrcBo46vsbjU3Qf2mZFDMqHrTq87jGmwRpagpoDBhw9pZobZEAP9Ykrh-wzNABawq8qXRnhSM0suiLN51oaWYUHL-7m5hbo5wNz3fY/w500-h281/Augusto+Pinochet.jpg" width="500" /></a></div><br /><p><span style="font-size: x-large;">Clique </span><a href="https://drive.google.com/file/d/1HZtTdSCbFtBnQtVaxizJnbJHgwuOpyQT/view?usp=sharing" rel="nofollow" style="font-size: x-large;" target="_blank">aqui</a><span style="font-size: x-large;"> para baixar o texto em formato PDF.</span></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-14131114317932509872020-08-31T16:16:00.003-07:002020-08-31T16:44:57.852-07:00A Lógica da Vida (Donald Stewart Jr.)<div class="separator"><p style="margin-left: 1em; margin-right: 1em;"><img alt="" height="169" src="data:image/png;base64,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width="452" /></p></div><p><span style="font-family: georgia; font-size: large;">Clique <a href="https://drive.google.com/file/d/1tkYA_ZIf7ofYfv_NTFYP9QJoUd82NdfO/view?usp=sharing" target="_blank">aqui</a> para baixar o texto em formato PDF.</span></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-14344911404215983072020-05-12T13:55:00.002-07:002020-05-12T13:56:13.731-07:00Ambientalismo: Uma Análise Libertária (Tiago Brum)<div style="text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjohKOgKadC6OT8JA_8xeYAnTSRVrYwiG8HXZ8kFk9m8Rvf3z_BYt66cB7I8phuW6pF9T-tUXiuGaYhmbfjhiXAUJFBMk96QcsKo6pWEYx2a0wDW2ZY8YCIy3prfOw7nrOt7OevUaIBH8Q/s1600/POLUI%25C3%2587%25C3%2583O.jpg" imageanchor="1"><img border="0" height="266" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjohKOgKadC6OT8JA_8xeYAnTSRVrYwiG8HXZ8kFk9m8Rvf3z_BYt66cB7I8phuW6pF9T-tUXiuGaYhmbfjhiXAUJFBMk96QcsKo6pWEYx2a0wDW2ZY8YCIy3prfOw7nrOt7OevUaIBH8Q/s400/POLUI%25C3%2587%25C3%2583O.jpg" width="400" /></a></div>
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Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-323946075758818465.post-10620389783263192242020-04-27T15:06:00.001-07:002020-04-27T15:06:24.090-07:00Idade Média: Uma Análise Libertária (Tiago Brum)<div style="text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjzMJK4JgmO3Rb4W8BL4U79PCUFWNqWUUKjRMrfhOsuLg4tcwSuSxSqYQlQPYixPviq4CavToj3sW23UI5eO9JtecCBS3aVoa-eiHUeJ_F_KWFfY-mmJ82FmtkyHcDaCY8gywFgVWmE0gE/s1600/IDADE+M%25C3%2589DIA.jpg" imageanchor="1"><img border="0" height="225" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjzMJK4JgmO3Rb4W8BL4U79PCUFWNqWUUKjRMrfhOsuLg4tcwSuSxSqYQlQPYixPviq4CavToj3sW23UI5eO9JtecCBS3aVoa-eiHUeJ_F_KWFfY-mmJ82FmtkyHcDaCY8gywFgVWmE0gE/s400/IDADE+M%25C3%2589DIA.jpg" width="400" /></a></div>
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<span style="font-family: Georgia, Times New Roman, serif; font-size: large;">Clique <a href="https://drive.google.com/file/d/18sOZZI6XhX9Kky3oZ5NpDiPBDlhWlcLh/view?usp=sharing" target="_blank">aqui</a> para baixar o texto.</span><br />
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