n 环直积子环的古萨特定理的一般化

KnE Life Sciences Pub Date : 2024-03-27 DOI:10.18502/kls.v8i1.15397

Muhsang Sudadama, Lieko Liedokto, Hery Susanto, I. Sulandra

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摘要

鲍尔等人描述了古萨特定理，代表了两个或多个群的直积的子群的特征。在本文中，我们将其扩展为一种环结构，描述了环的直接乘积的子环的特征。这种研究方法是类比鲍尔等人在群中的证据进行归纳。在我们的主要结果中，环的直积的每一个子环都是由环与因子环之间的环外貌决定的。关键词古萨特定理、子环、环

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Generalization of Goursat's Theorem for Subrings of Direct Products of n Rings

Bauer et al. describe Goursat’s theorem, representing the characteristics of subgroups of a direct product of two or more groups. In this paper, we expand into a ring structure that describes the characteristics of subrings of a direct product of rings. This research method is to analogize the evidence by Bauer et al. in the group for generalization. In our main results, every subring of the direct product of rings is determined by ring epimorphism between the ring and factor ring. Keywords: Goursat’s theorem, subrings, rings

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KnE Life Sciences

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