Nearrings of functions without identity determined by a single subgroup

Q4 Mathematics

Journal of Algebra and Related Topics Pub Date : 2021-06-01 DOI:10.22124/JART.2021.15730.1190

G. Cannon, V. Enlow

引用次数: 0

Abstract

Let $(G, +)$ be a finite group, written additively with identity 0, but not necessarily abelian, and let $H$ be a nonzero, proper subgroup of $G$. Then the set $M = {f : G to G | f(G) subseteq H hbox{and} f(0) = 0 }$ is a right, zero-symmetric nearring under pointwise addition and function composition. We find necessary and sufficient conditions for $M$ to be a ring and determine all ideals of $M$, the center of $M$, and the distributive elements of $M$.

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由单个子群确定的无恒等函数的近环

设$(G， +)$是一个有限群，以单位0相加，但不一定是阿贝尔群，且设$H$是$G$的非零真子群。则集合$M = {f: G to G | f(G) subseteq H hbox{and} f(0) = 0}$是一个点加法和函数复合下的右零对称近环。我们找到了$M$是环的充分必要条件，并确定了$M$的所有理想、$M$的中心和$M$的分配元。

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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