标题:
本原可分rpp半群Primitively Decomposable rpp Semigroups
作者:
邱小伟, 郭小江, 王军旗, 吴瑕
关键字:
本原可分, rpp半群, Rees矩阵半群Primitively Decomposable; rpp Semigroups; Rees Matrix Semigroups
期刊名称:
《Pure Mathematics》, Vol.2 No.4, 2012-11-01
摘要:
完全0-单半群是一类非常重要的正则半群,也是正则半群结构基础。本原可分rpp半群是完全0-单半群在rpp半群理论中推广。本文主要研究本原可分rpp半群,给出了这类半群的若干特征,并证明了:半群为本原可分rpp半群当且仅当它是满足一些条件的左消幺半群上的Rees矩阵半群的同态像。此外,还研究了若干特类。
Completely 0-simple semigroup is a very important class of regular semigroups, and it’s also the basis for the structure of regular semigroups. Primitively decomposable rpp semigroups are generalizations of completely 0-simple semigroups in the range of rpp semigroups. In this paper, the author studied primitively decomposable rpp semigroups, gave some characterizations for these semigroups and proved that a semigroup S was primitively decomposable rpp semigroup if and only if it was a homomorphic image of Rees matrix semigroup over a left cancellative monoid satisfying some conditions. In addition, some special primitively decomposable rpp semigroups were considered and discussed.