Virtually Semisimple Modules and a Generalization of the Wedderburn-Artin Theorem

Abstract

By any measure, semisimple modules form one of the most important classes of modules and play a distinguished role in the module theory and its applications. One of the most fundamental results in this area is the Wedderburn-Artin theorem. In this paper, we establish natural generalizations of semisimple modules and give a generalization of the Wedderburn-Artin theorem. We study modules in which every submodule is isomorphic to a direct summand and name them virtually semisimple modules. A module RM is called completely virtually semisimple if each submodules of M is a virtually semisimple module. A ring R is then called left ( completely) virtually semisimple if RR is a left (compleatly) virtually semisimple R-module. Among other things, we give several characterizations of left (completely) virtually semisimple rings. For instance, it is shown that a ring R is left completely virtually semisimple if and only if R Π i=1 k Mni(Di) where k, n1, ...,nk∈ N and each Di is a principal left ideal domain. Moreover, the integers k,~ n1, ...,nk and the principal left ideal domains D1, ...,Dk are uniquely determined (up to isomorphism) by R.