Representation-theoretic properties of balanced big Cohen-Macaulay modules

Abstract

Let (R, , k) be a complete Cohen-Macaulay local ring. In this paper, we assign a numerical invariant, for any balanced big Cohen-Macaulay module, called -length. Among other results, it is proved that, for a given balanced big Cohen-Macaulay R-module M with an -primary cohomological annihilator, if there is a bound on the -length of all modules appearing in -support of M, then it is fully decomposable, i.e. it is a direct sum of finitely generated modules. While the first Brauer-Thrall conjecture fails in general by a counterexample of Dieterich dealing with multiplicities to measure the size of maximal Cohen-Macaulay modules, our formalism establishes the validity of the conjecture for complete Cohen-Macaulay local rings. In addition, the pure-semisimplicity of a subcategory of balanced big Cohen-Macaulay modules is settled. Namely, it is shown that R is of finite -type if and only if the category of all fully decomposable balanced big Cohen-Macaulay modules is closed under kernels of epimorphisms. Finally, we examine the mentioned results in the context of Cohen-Macaulay artin algebras admitting a dualizing bimodule ω, as defined by Auslander and Reiten. It will turn out that, ω-Gorenstein projective modules with bounded -support are fully decomposable. In particular, a Cohen-Macaulay algebra is of finite -type if and only if every ω-Gorenstein projective module is of finite -type, which generalizes a result of Chen for Gorenstein algebras. Our main tool in the proof of results is Gabriel-Roiter (co)measure, an invariant assigned to modules of finite length, and defined by Gabriel and Ringel. This, in fact, provides an application of the Gabriel-Roiter (co)measure in the category of maximal Cohen-Macaulay modules.