A semigroup-theoretical view of direct-sum decompositions and associated combinatorial problems

Abstract

Let R be a ring and let C be a small class of right R-modules which is closed under finite direct sums, direct summands, and isomorphisms. Let V ( C) denote a set of representatives of isomorphism classes in C and, for any module M in C, let [M] denote the unique element in V ( C) isomorphic to M. Then V ( C) is a reduced commutative semigroup with operation defined by [M] + [N] = [M N], and this semigroup carries all information about direct-sum decompositions of modules in C. This semigroup-theoretical point of view has been prevalent in the theory of direct-sum decompositions since it was shown that if EndR (M) is semilocal for all M∈ C, then V ( C) is a Krull monoid. Suppose that the monoid V ( C) is Krull with a finitely generated class group (for example, when C is the class of finitely generated torsion-free modules and R is a one-dimensional reduced Noetherian local ring). In this case we study the arithmetic of V ( C) using new methods from zero-sum theory. Furthermore, based on module-theoretic work of Lam, Levy, Robson, and others we study the algebraic and arithmetic structure of the monoid V ( C) for certain classes of modules over Pr\"ufer rings and hereditary Noetherian prime rings.