Intervals of posets of a zero-divisor graph

IF 0.9 3区数学 Q2 MATHEMATICS Mathematica Slovaca Pub Date : 2024-08-14 DOI:10.1515/ms-2024-0061

John D. LaGrange

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Abstract

This article is concerned with bounded partially ordered sets P such that for every p ∈ P ∖ {1} there exists q ∈ P ∖ {0} such that 0 is the only lower bound of {p, q}. The posets P such that P ≅ Q if and only if P and Q have isomorphic zero-divisor graphs are completely characterized. In the case of finite posets, this result is generalized by proving that posets with isomorphic zero-divisor graphs form an interval under the partial order given by P ≲ Q if and only if there exists a bijective poset-homomorphism P → Q. In particular, the singleton intervals correspond to the posets that are completely determined by their zero-divisor graphs. These results are obtained by exploring universal and couniversal orderings with respect to posets that have isomorphic zero-divisor graphs.

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零因子图的正集区间

本文关注有界部分有序集合 P，对于每一个 p∈P ∖ {1} 存在 q∈P ∖ {0} ，使得 0 是 {p, q} 的唯一下界。当且仅当 P 和 Q 具有同构的零分维图形时，P ≅ Q 的正集 P 才具有完全的特征。在有限正集的情况下，通过证明具有同构零因子图的正集在 P ≲ Q 给定的偏序下形成一个区间，当且仅当存在一个双射正集同构 P → Q 时，这一结果得到了推广。这些结果是通过探索与具有同构零分因子图的正集有关的普遍排序和反普遍排序得到的。

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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来源期刊

Mathematica Slovaca 数学-数学

CiteScore

2.10

自引率

6.20%

发文量

审稿时长

6-12 weeks

期刊介绍： Mathematica Slovaca, the oldest and best mathematical journal in Slovakia, was founded in 1951 at the Mathematical Institute of the Slovak Academy of Science, Bratislava. It covers practically all mathematical areas. As a respectful international mathematical journal, it publishes only highly nontrivial original articles with complete proofs by assuring a high quality reviewing process. Its reputation was approved by many outstanding mathematicians who already contributed to Math. Slovaca. It makes bridges among mathematics, physics, soft computing, cryptography, biology, economy, measuring, etc.　 The Journal publishes original articles with complete proofs. Besides short notes the journal publishes also surveys as well as some issues are focusing on a theme of current interest.

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