Two Generalizations of the Wedderburn-Artin Theorem with Applications

Abstract

We say that an R-module M is virtually simple if M≠ (0) and N M for every non-zero submodule N of M, and virtually semisimple if each submodule of M is isomorphic to a direct summand of M. We carry out a study of virtually semisimple modules and modules which are direct sums of virtually simple modules. Our theory provides two natural generalizations of the Wedderburn-Artin Theorem and an analogous to the classical Krull-Schmidt Theorem. Some applications of these theorems are indicated. For instance, it is shown that the following statements are equivalent for a ring R: (i) Every finitely generated left (right) R-modules is virtually semisimple; (ii) Every finitely generated left (right) R-modules is a direct sum of virtually simple modules; (iii) RΠi=1k Mni(Di) where k, n1,…,nk∈ N and each Di is a principal ideal V-domain; and (iv) Every non-zero finitely generated left R-module can be written uniquely (up to isomorphism and order of the factors) in the form Rm1 … Rmk where each Rmi is either a simple R-module or a left virtually simple direct summand of R.