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Main Author: Nezhad, Babak Jabbar
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2410.16925
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author Nezhad, Babak Jabbar
author_facet Nezhad, Babak Jabbar
contents In this paper, we present a paradox arising from the acceptance of the Law of Excluded Middle (LEM) within classical mathematics. Specifically, we construct a nonzero analytic function on a connected open subset of the complex plane whose zeros are not isolated. This contradicts a fundamental theorem in complex analysis, thereby revealing an inconsistency tied to LEM. Unlike traditional critiques that reject LEM in favor of intuitionistic or constructive mathematics, we argue that LEM is instrumental in discovering \textbf{relations} between objects and facts rather than the objects themselves. Since we are not always in direct attachment with objects, this relational perspective introduces \textbf{inherent uncertainty} in mathematical reasoning. Consequently, we propose that the logical framework of the world is undecidable, making contradictions possible in more complex contexts. Our findings suggest that LEM, while powerful, may not be universally reliable in all mathematical frameworks. This work has implications for foundational mathematics, particularly in relation to the limits of classical logic and the necessity of alternative logical paradigms.
format Preprint
id arxiv_https___arxiv_org_abs_2410_16925
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle A Paradox on the Law of Excluded Middle in the framework of category of set
Nezhad, Babak Jabbar
General Mathematics
30C15, 03E25
In this paper, we present a paradox arising from the acceptance of the Law of Excluded Middle (LEM) within classical mathematics. Specifically, we construct a nonzero analytic function on a connected open subset of the complex plane whose zeros are not isolated. This contradicts a fundamental theorem in complex analysis, thereby revealing an inconsistency tied to LEM. Unlike traditional critiques that reject LEM in favor of intuitionistic or constructive mathematics, we argue that LEM is instrumental in discovering \textbf{relations} between objects and facts rather than the objects themselves. Since we are not always in direct attachment with objects, this relational perspective introduces \textbf{inherent uncertainty} in mathematical reasoning. Consequently, we propose that the logical framework of the world is undecidable, making contradictions possible in more complex contexts. Our findings suggest that LEM, while powerful, may not be universally reliable in all mathematical frameworks. This work has implications for foundational mathematics, particularly in relation to the limits of classical logic and the necessity of alternative logical paradigms.
title A Paradox on the Law of Excluded Middle in the framework of category of set
topic General Mathematics
30C15, 03E25
url https://arxiv.org/abs/2410.16925