Countably generated modules over complete discrete valuation rings

We prove that, for every regular ring R, there exists an isomorphism between the monoids of isomorphism classes of finitely generated projective right modules Ž Ž . . Ž . over the rings End R and RCFM R , where the latter denotes the ring of R R countably infinite row-and column-finite matrices over

We consider a unified setting for studying local valuated groups and cosetvaluated groups, emphasizing the associated filtrations rather than the values of elements. Stable exact sequences, projectives, and injectives are identified in the encompassing category, and in the category corresponding to

The purpose of this paper is to outline a new approach to the classification of finitely generated indecomposable modules over certain kinds of pullback rings. If R is the pullback of two hereditary noetherian homogeneously serial rings, finitely generated over their centers, over a common semi-simp