Direct sums of representations as modules over their endomorphism rings

Abstract

This paper is devoted to the study of the endo-structure of infinite direct sums i ∈ I Mi of indecomposable modules Mi over a ring R. It is centered on the following question: If S = EndR ( i ∈ I Mi ), how much pressure, in terms of the S-structure of i ∈ I Mi, is required to force the Mi into finitely many isomorphism classes? In case the Mi are endofinite (i.e., of finite length over their endomorphism rings), the number of isomorphism classes among the Mi is finite if and only if i ∈ I Mi is endo-noetherian and the Mi form a right T-nilpotent class. This is a corollary of a more general theorem in the paper which features the weaker conditions of (right or left) semi-T-nilpotence as well as the endosocle of a module. This result is sharpened in the case of Artin algebras, by showing that then, if the Mi are finitely generated, the direct sum i ∈ I Mi is endo-Artinian if and only if it is -algebraically compact.