Grothendieck groups and completions of Gorenstein local rings

Abstract

Let (A,m) be an excellent Gorenstein local ring of dimension d ≥ 2 which is an isolated singularity. Let A denote the completion of A. If G(A) is the Grothendieck group of A then by G(A)Q we denote G(A)Z Q. We prove that the natural map G(A)Q → G(A)Q is an isomorphism if and only if for any maximal Cohen-Macaulay (= MCM) A-module M there exists an MCM A-module N and integers r ≥ 1 and s ≥ 0 (depending on M) such that Mr As N. An essential ingredient is the classification of Q-subspaces of G(C)Q (here C is a skelletaly small triangulated category) in terms of certain dense subcategories of C. We also give criterion for a Henselian Gorenstein ring B (not an isolated singularity) such that the natural map G(B)Q → G(B)Q is an isomorphism ( when B = 2, 3). We give many examples where our result holds.

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