m-幂等超环的交换商结构

Pub Date : 2020-03-01 DOI:10.2478/auom-2020-0015

A. Zadeh, M. Norouzi, I. Cristea

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引用次数: 4

摘要

α*关系是超环上的一个基本关系，它是超环上使商结构R/α*为交换环的最小的强正则关系。本文在超环上引入了小于α*的关系ζm，并证明了在一类特定的m-幂等超环R上，它是使商环R/ζ*m可交换的最小强正则关系。说明并讨论了这一新关系的一些性质及其与α*关系的区别。最后，我们证明了在这类m-幂等超环上，ζm是α*的一个新的表示。

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The commutative quotient structure of m-idempotent hyperrings

Abstract The α* -relation is a fundamental relation on hyperrings, being the smallest strongly regular relation on hyperrings such that the quotient structure R/α* is a commutative ring. In this paper we introduce on hyperrings the relation ζm, which is smaller than α*, and show that, on a particular class of m-idempotent hyperrings R, it is the smallest strongly regular relation such that the quotient ring R/ζ*m is commutative. Some properties of this new relation and its differences from the α* -relation are illustrated and discussed. Finally, we show that ζm is a new representation for α* on this particular class of m-idempotent hyperrings.

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