Pruefer modules in filtration categories of semibricks

Abstract

Let R be a ring with unity and X a semibrick in the module category Mod\,R, that is, a class of pairwise orthogonal finitely presented modules whose endomorphism rings are division rings. We study the full subcategory Filt(X) consisting of all modules admitting a filtration with factors in X. We show that Filt(X) is a wide subcategory of Mod\,R. For the Ext-orthogonal class \[ X = \M ∈ Mod\,R Ext1R(X,M)=0 for all X ∈ X\ \] we construct, for every module Y, an X-envelope YX(∞) as a direct limit of iterated universal short exact sequences. Assume that every X ∈ X has projective dimension at most one and that HomR(X,R)=0 for all X ∈ X. Then the envelope RX(∞) of the regular module is isomorphic to the universal localization RX of R at X in the sense of Schofield. The X-envelopes of modules in X are called Pr\"ufer modules since they share many properties with classical Pr\"ufer groups and with Pr\"ufer modules over tame hereditary algebras. We prove that every injective object in Filt(X) is a direct sum of such Pr\"ufer modules.