The Existence of Relative pure Injective Envelopes
Abstract
Let S be a class of finitely presented R-modules such that R∈ S and S has a subset S*, with the property that for any U∈ S there is a U*∈ S* with U* U. We show that the class of S-pure injective R-modules is preenveloping. As an application, we deduce that the left global S-pure projective dimension of R is equal to its left global S-pure injective dimension. As our main result, we prove that, in fact, the class of S-pure injective R-modules is enveloping.
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