在1921年(1908年)的《概率论》(1921年)中对乘数概念进行了逻辑和数学上的发展,后来被他用于《通论》(1936年)。

M. E. Brady
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引用次数: 0

摘要

在1921年出版的《概率论》一书中,凯恩斯已经从数学、逻辑和技术上提出了乘数概念。同样的分析可以在他1908年的第二篇剑桥奖学金论文中找到。萨缪尔森在1977年发表在《经济文献杂志》上的文章中明确提到了凯恩斯的风险(R)公式,该公式由凯恩斯在《概率论》第315页提出。然而,萨缪尔森忽略了《概率论》第315页的脚注1,凯恩斯在其中对一个几何级数进行了明确的乘数分析,这是一个递减的无穷级数,因为凯恩斯忽略了在级数中的项数n趋于无穷时取级数极限的中间步骤。凯恩斯只是给出了人们在取了极限之后会得到的最终答案。萨缪尔森还忽略了凯恩斯在《概率论》第353页的广义风险分析,该分析扩展了凯恩斯的风险分析,该分析使用切比雪夫不等式推导出了一个下界。这将是一个不精确的概率,随着获得更多的观察结果而变得更加准确,最终导致从正态分布中精确估计概率,如果决策者能够负担得起延迟所需时间的行动。肯特(R. Kent) 2007年在《政治经济史》(History of Political economics)上发表的文章完全没有解决理查德·卡恩(Richard Kahn)使用乘数的想法是从哪里得到的这个问题。1936年,卡恩在《经济统计评论》(Review of Economic Statistics)上发表的奈瑟的一篇论文的注释中说,“……我自己的想法主要来自凯恩斯先生。”(Kahn,1936,第144页)。卡恩的贡献源于与凯恩斯的私人谈话,凯恩斯向卡恩展示了他在《概率论》(A treatise on probability)第26章的分析,该分析位于第315页的脚注1。凯恩斯是历史上首创乘数数学理论的人,凯恩斯在《通论》中将其称为乘数逻辑理论。凯恩斯在《通论》第122-123页对乘数逻辑理论的讨论,只是对凯恩斯在《概率论》第315页提出的数学分析的文学描述。肯特相信凯恩斯在1929年提出了乘数分析,这是正确的。凯恩斯在把级数相加时是否犯了算术错误,这个问题与“谁是乘数理论的创造者”这一主要问题完全无关
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Keynes, and Only J. M. Keynes, Was Responsible for the Logical and Mathematical Development of the Multiplier Concept in 1921(1908) in His a Treatise on Probability (1921) That He Later Used in the General Theory (1936)
J M Keynes had already developed the theory of the Multiplier concept mathematically, logically, and technically in his "A Treatise on Probability" (1921). The same analysis can be found in his second Cambridge Fellowship Dissertation of 1908. Samuelson explicitly covered the material, Keynes’s risk (R) formula, presented by Keynes on page 315 of the A Treatise on Probability, in his 1977 article in the Journal of Economic Literature. However, Samuelson overlooked the footnote, footnote 1 on page 315 of the A Treatise on Probability, in which Keynes applies an explicit multiplier analysis to a geometric, declining, infinite series because Keynes left out the intermediate steps of taking the limit of the series as n, the number of terms in the series, approached infinity. Keynes simply gave the final answer one will obtain after he has taken the limit. Samuelson also overlooked Keynes’s generalized risk analysis on page 353 of the A Treatise on Probability ,which extended Keynes’s Risk analysis ,which used Chebyshev’s Inequality to derive a lower bound .This would be an imprecise probability that would become more accurate as more observations were obtained, leading eventually to a precise estimate of probability from the normal distribution if the decision maker could afford to delay action for the period of time needed. R. Kent’s 2007 article in the History of Political Economy leaves completely unresolved the issue of where Richard Kahn got the idea for the use of the multiplier from. Kahn, in 1936, stated, in a note on a paper of Neisser’s that appeared in the Review of Economic Statistics, that “…my own ideas were largely derived from Mr. Keynes.” (Kahn,1936, p.144). Kahn’s contribution originated in private conversations with Keynes, where Keynes showed Kahn his chapter 26 analysis contained in the A treatise on probability on page 315 in footnote 1. Keynes, and no one else in history, was the person who had already originated the mathematical theory of the multiplier, which Keynes in the General Theory called the logical theory of the multiplier. Keynes's discussion of the logical theory of the Multiplier on pp.122-123 of the General Theory is simply a literary description of the mathematical analysis presented by Keynes on page 315 of the A Treatise on Probability. Kent's belief that Keynes had presented a multiplier analysis in 1929 is correct. The issue of whether Keynes made an arithmetic error in adding up the terms of the series is completely irrelevant to the main issue, which is “who is the person who created the theory of the multiplier?”
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