Object-unital groupoid graded modules

Abstract

In a previous article (see CNP), we introduced and analyzed ring-theoretic properties of object unital G-graded rings R, where G is a groupoid. In the present article, we analyze the category of unitary -graded modules over such rings. Following ideas developed earlier by one of the authors in lundstrom2004, we analyze the forgetful functor U and aim to determine properties P for which the following implications are valid for modules M in : M is P ⇒ U(M) is P; U(M) is P ⇒ M is P. Here we treat the cases when P is any of the properties: direct summand, projective, injective, free, simple and semisimple. Moreover, graded versions of results concerning classical module theory are established, as well as some structural properties related to the category .