受戈特洛布-弗雷格定义启发的非循环数概念

arXiv - MATH - History and Overview Pub Date : 2024-06-13 DOI:arxiv-2406.08715

Marco Aurélio Spohn

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摘要

戈特洛布-弗雷格巧妙地提出了一个关于数概念的纯逻辑定义。然而，我们可以说他的定义在某种程度上是循环论证，因为它依赖于一对一关系的概念。只有当 "数 "的概念具有 "投射/反射 "或 "约束 "的特性时，它才是有意义的。当我们把数字视为对象（无论它们是什么）的抽象时，说属于概念 F 的数字与属于概念 G 的数字相同，就意味着 F 中的对象与 G 中的对象之间存在着投射/反射或绑定。首先，我们介绍基于投影和反射关系的定义；然后，我们介绍基于绑定关系的定义。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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A non-circular concept of number inspired by Gottlob Frege's definition

Gottlob Frege ingeniously presented a purely logical definition of the concept of number. However, one can claim that his definition is, in some way, circular, as it relies on the concept of one-to-one relation. The concept of number only makes sense when it presents the property of projection/reflection or binding. When we consider a number as an abstraction of objects, whatever they may be, saying that a number that belongs to the concept F is the same as that which belongs to the concept G means there is a projection/reflection, or binding, between the objects in F and the objects in G. We present a definition based on both equivalent approaches. First, we introduce the definition based on the relations of projection and reflection; then, we present the definition based on the relation of binding.

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arXiv - MATH - History and Overview

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