摘要
设R是有单位元的环.我们称R为循环环,如果加群(R,+)是循环群;称R为U-循环群,如果R的全体单位作成的乘群U(R)是循环群;称R为双循环环,如果(R,+)和U(R)都是循环群.本文利用(R,+)与U(R)的一些性质讨论环R的性质和结构,所得主要结果如下:(1)若R是Artin半单环,则U(R)是有限的当且仅当R是有限的.(2)域F是U-循环环当且仅当F是有限的.(3)若R是域F上所有n阶上三角形矩阵作成的环,则R是U-循环环当且仅当n=2和F≌Z2.(4)若R是无限环,则R是双循环环当且仅当R≌Z.(5)设R是有限环且|R|=n>1,则R是双循环环当且仅当R≌Zn,n为2,4,pk,2pk,其中p为任意奇素数,k为任意正整数.
Suppose that R is a ring with unit element. We denote the additive group of R by (R , + ) ,and the unit group of R by U(R). We call R is a cyclic ring if (R, + ) is a cyclic group, R a Ucyclic ring if R is a cyclic group, and R a double cyclic ring if (R, + ) and U(R) both are cyclic groups. In this paper, we discuss the property and the structure of R by use of (R , + ) and U (R). The main results are as follows.1. Let R be an Artin Semi-simple ring. Then U(R) is finite if and only if R is finite.2. The field F is a U-Cyclic ring if and only if F is finite.3. Let R be the ring of n ×n(n>1) upper-triangular matrices with entries from the field F.Then R is a U-cyclic ring if and only if n=2 and F≌Z2.4. Let R be an infinite ring. Then R is double Cyclic ring if and if only if R≌Z.5. Let R be a finite ring and |R|=n>1. Then R is a double cyclic ring if and only if R≌Zn, where n are the integers 2, 4, pk, 2pk (p is any odd prime number, and k any positive integer).
出处
《安徽大学学报(自然科学版)》
CAS
1994年第4期16-21,共6页
Journal of Anhui University(Natural Science Edition)
关键词
循环环
U-循环环
双循环环
cyclic rings, U-cyclic rings, double cyclic rings
