A Generalization of Mathieu Subspaces to Modules of Associative Algebras

Abstract

We first propose a generalization of the notion of Mathieu subspaces of associative algebras A, which was introduced recently in [Z4] and [Z6], to A-modules M. The newly introduced notion in a certain sense also generalizes the notion of submodules. Related with this new notion, we also introduce the sets σ(N) and τ(N) of stable elements and quasi-stable elements, respectively, for all R-subspaces N of A-modules M, where R is the base ring of A. We then prove some general properties of the sets σ(N) and τ(N). Furthermore, examples from certain modules of the quasi-stable algebras [Z6], matrix algebras over fields and polynomial algebras are also studied.