一些多数运算的寻找及其中心化一元的研究

2023 IEEE 53rd International Symposium on Multiple-Valued Logic (ISMVL) Pub Date : 2023-05-01 DOI:10.1109/ISMVL57333.2023.00033

Hajime Machida

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引用次数: 0

摘要

一个集中的单调体M是一组一元操作的集合，它们与某个操作集合F交换。在3元集合上，多数极小运算作为极大集中一元群的证明。在本文中，我们从一个这样的多数运算开始，得到了它在k元素集合上对任意k≥3的推广，称为mb。我们明确地描述了以mb为见证的集中单群M(mb)，然后证明了当k > 3时它不是极大的，与k = 3时相反。

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Search for Some Majority Operation and Studies of its Centralizing Monoid

A centralizing monoid M is a set of unary operations which commute with some set F of operations. Here F is called a witness of M.On a 3-element set, majority minimal operations serve as witnesses of maximal centralizing monoids. In this paper, we start with one such majority operation and obtain its generalization, called mb, on a k-element set for any k ≥ 3. We explicitly describe the centralizing monoid M(mb) with mb as its witness and then prove it is not maximal if k > 3, contrary to the fact for k = 3.

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2023 IEEE 53rd International Symposium on Multiple-Valued Logic (ISMVL)

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