Decompositions into a direct sum of projective and stable submodules

Abstract

A module M is called stable if it has no nonzero projective direct summand. For a ring R , we study conditions under which R-modules from certain classes decompose as a direct sum of a projective submodule and a stable submodule. Over an arbitrary ring, modules of finite uniform dimension or finite hollow dimension can be decomposed as a direct sum of a projective submodule and a stable submodule. By using the Auslander-Bridger transpose of finitely presented modules, we prove that every finitely presented right R-module over a left semihereditary ring R has such a decomposition. Our main focus in this article is to give examples where such a decomposition fails. We give some ring examples over which there exists an infinitely generated or finitely generated or finitely presented module where such a decomposition fails. Our main example is a cyclically presented module M over a commutative ring such that~M has no such decomposition and M is not projectively equivalent to a stable module.

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