On Semisimple Proto-Abelian Categories Associated to Inverse Monoids

Abstract

Let G be a finite abelian group written multiplicatively, with G = G \0\ the pointed abelian group formed by adjoining an absorbing element 0. There is an associated finitary, proto-abelian category VectG, whose objects can be thought of as finite-dimensional vector spaces over G. The class of G-linear monoids are then defined in terms of this category. In this paper, we study the finitary, proto-abelian category Rep(M,G) of finite-dimensional G-linear representations of a G-linear monoid M. Although this category is only a slight modification of the usual category of M-modules, it exhibits significantly different behavior for interesting classes of monoids. Assuming that the regular principal factors of M are objects of Rep(M,G), we develop a version of the Clifford-Munn-Ponizovski i Theorem and classify the M for which each non-zero object of Rep(M,G) is a direct sum of simple objects. When M is the endomorphism monoid of an object in VectG, we discuss alternate frameworks for studying its G-linear representations and contrast the various approaches.

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