Cohen-Macaulay approximations over generically Gorenstein rings

Abstract

Let (R,m) be a Cohen-Macaulay local ring with canonical module that is generically Gorenstein. In this paper, I prove isomorphisms relating the minimal MCM approximations and minimal FID hulls of modules constructed from a canonical ideal \,ω ⊂ R, including \,ω/xR, with \,x ∈ ω\, a nonzerodivisor, \,(ω/xR):=Ext1R(ω/xR,ω), \,R/ω2, and \,ω/ω2. I also prove that if R is not Gorenstein, then δR(ω/xR )=δR((ω/xR ) )=0\, and \,γR(1R(ω/xR ) )=γR(1R((ω/xR)) )=0, where δR is Auslander's \,δ-invariant and γR is the dual γ-invariant.

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