关于无穷分划和部分Brauer单调的同余

IF 0.6 4区数学 Q3 MATHEMATICS Moscow Mathematical Journal Pub Date : 2018-09-19 DOI:10.17323/1609-4514-2022-22-2-295-372

J. East, N. Ruškuc

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引用次数: 9

摘要

我们给出了分块幺拟$P_X$和部分Brauer幺拟$PB_X$上的同余的一个完整描述，其中$X$是一个任意的无限集，以及所有这些同余形成的格。我们的结果补充了East、Mitchell、Ruskuc和Torpey最近一篇关于有限情况的文章中的结果。根据我们的分类结果，我们证明了$P_X$和$PB_X$的同余格是同构的，并且是分配的和良好的拟序的。我们还计算生成任何同余所需的最小分割对数；当这个数是无穷大时，它取决于某些极限基数的余数。

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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Congruences on Infinite Partition and Partial Brauer Monoids

We give a complete description of the congruences on the partition monoid $P_X$ and the partial Brauer monoid $PB_X$, where $X$ is an arbitrary infinite set, and also of the lattices formed by all such congruences. Our results complement those from a recent article of East, Mitchell, Ruskuc and Torpey, which deals with the finite case. As a consequence of our classification result, we show that the congruence lattices of $P_X$ and $PB_X$ are isomorphic to each other, and are distributive and well quasi-ordered. We also calculate the smallest number of pairs of partitions required to generate any congruence; when this number is infinite, it depends on the cofinality of certain limit cardinals.

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来源期刊

Moscow Mathematical Journal 数学-数学

CiteScore

1.40

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The Moscow Mathematical Journal (MMJ) is an international quarterly published (paper and electronic) by the Independent University of Moscow and the department of mathematics of the Higher School of Economics, and distributed by the American Mathematical Society. MMJ presents highest quality research and research-expository papers in mathematics from all over the world. Its purpose is to bring together different branches of our science and to achieve the broadest possible outlook on mathematics, characteristic of the Moscow mathematical school in general and of the Independent University of Moscow in particular. An important specific trait of the journal is that it especially encourages research-expository papers, which must contain new important results and include detailed introductions, placing the achievements in the context of other studies and explaining the motivation behind the research. The aim is to make the articles — at least the formulation of the main results and their significance — understandable to a wide mathematical audience rather than to a narrow class of specialists.