On zero-divisor graphs of infinite posets

Radomír Halaš; Jozef Pócs

doi:10.1007/s00500-024-09958-8

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On zero-divisor graphs of infinite posets

Radomír Halaš Jozef Pócs

Year: 2024 Journal: Soft Computing Vol: 28 (20)Pages: 12113-12118 Publisher: Springer Science+Business Media

DOI: 10.1007/s00500-024-09958-8

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Abstract

Abstract It is known that the so-called Beck’s conjecture, i.e. the equality of the finite clique and chromatic numbers of a zero-divisor graph, holds for partially ordered sets Halaš and Jukl (Discrete Math 309(13):4584–4589, 2009). In this paper we present a simple direct proof of this fact. Also, the case when the finiteness assumption of the clique number is omitted is investigated. We have shown that the conjecture fails in general and a bunch of counterexamples is presented.

Keywords:

Mathematics Counterexample Combinatorics Discrete mathematics Conjecture Clique graph Zero (linguistics) Simple graph Zero divisor Clique number Simple (philosophy) Graph Line graph Graph power

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Rings, Modules, and Algebras

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On zero-divisor graphs of infinite posets

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