Is mathematics consistent?

Hitoshi Kitada (University of Tokyo)

arXiv:math/0306007·math.GM·May 23, 2007·3 cites

Is mathematics consistent?

Hitoshi Kitada (University of Tokyo)

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TL;DR

This paper explores the longstanding question of whether set theory, a foundational framework for mathematics, is free of contradictions, addressing a core issue in mathematical logic and foundations.

Contribution

It presents an analysis or argument regarding the consistency of set theory, contributing to foundational debates in mathematics.

Findings

01

Discussion on the implications of set theory's consistency

02

Analysis of potential contradictions in set theory

03

Evaluation of existing consistency proofs

Abstract

A question is proposed whether or not set theory is consistent.

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Taxonomy

TopicsMathematics Education and Teaching Techniques