What enabled the production of mathematical knowledge in complex analysis?

IF 0.5 Q4 EDUCATION & EDUCATIONAL RESEARCH
José Gerardo Piña-Aguirre, Rosa María Farfán Márquez
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引用次数: 0

Abstract

With the objective of identifying intrinsic forms of mathematical production in complex analysis (CA), this study presents an analysis of the mathematical activity of five original works that contributed to the development of Cauchy’s integral theorem. The analysis of the mathematical activity was carried out through the identification of the types of expressions used and the way they were used by the historical subjects when communicating their results, to subsequently identify transversal elements of knowledge production. The analysis was refined by the notion of confrontation, which depicts the development of mathematical knowledge through the idea of building knowledge against previous knowledge. As a result of the study we established epistemological hypothesis, which are conceived as conjectures that reveal ways in which mathematical knowledge was generated in CA.
是什么使复杂分析中的数学知识得以产生?
为了确定复杂分析(CA)中数学生产的内在形式,本研究对有助于柯西积分定理发展的五部原创作品的数学活动进行了分析。对数学活动的分析是通过识别所使用的表达类型以及历史科目在交流结果时使用的方式来进行的,从而确定知识生产的横向要素。这种分析是通过对抗的概念来完善的,它通过对先前知识的构建来描述数学知识的发展。作为研究的结果,我们建立了认识论假设,这些假设被认为是猜测,揭示了数学知识在CA中产生的方式。
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