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W82132905 abstract "The purpose of this paper is to give a new proof of the Joyal-Tierney theorem (unpublished), which asserts that a morphism f : R → S of commutative rings is an effective descent morphism for modules if and only if f is pure as a morphism of R-modules. Let R be a commutative ring with unit and R−mod the category of R-modules. Since, for any R-module M , the group C(M) = HomAb(M,Q/Z) (where Ab is the category of abelian groups and Q/Z is the rational circle abelian group) becomes an R-module with the action of R on C(M) by (rf)(m) = f(rm) , we can define a functor C : (R−mod)op → R−mod, given by C(M) = HomAb(M,Q/Z). Since the abelian group Q/Z is an injective cogenerator in the category of abelian groups (see, for example, [1]), the functor C is exact and reflects isomorphisms. We say that a morphism f : M → M ′ of R-modules is pure if for any R-module N , 1N ⊗R f : N ⊗R M → N ⊗R M ′ is monic. Let f : M → M ′ be a morphism of R-modules. The next lemma follows from the commutativity of the diagram HomR(C(M), C(M ′)) ≈ HomR(C(M),C(f)) HomR(C(M,C(M))) ≈ C(C(M)⊗R M ′) C(1C(M)⊗Rf) C(C(M)⊗R M), where the vertical morphisms are the canonical isomorphisms. 1. Lemma. Let f : M → M ′ be a morphism of R-modules. The following conditions are equivalent: (a) f is a pure morphism of R-modules. (b) C(f) is a split epimorphism of R-modules. Let f : R → S be a morphism of commutative rings. Recall that a descent datum on an object M ∈ Ob(S−mod) can be described as an S-module morphism θ : M → S⊗RM such that θ makes Received by the editors 1999 August 9 and, in revised form, 2000 February 2. Published on 2000 March 9. 2000 Mathematics Subject Classification: 13C99,18A20,18A30,18A40." @default.
W82132905 created "2016-06-24" @default.
W82132905 creator A5078223444 @default.
W82132905 date "2000-01-01" @default.
W82132905 modified "2023-09-23" @default.
W82132905 title "Pure morphisms of commutative rings are effective descent morphisms for modules. A new proof." @default.
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