The Gorenstein and complete intersection properties of associated graded rings

Abstract

Let I be an m-primary ideal of a Noetherian local ring (R,m). We consider the Gorenstein and complete intersection properties of the associated graded ring G(I) and the fiber cone F(I) of I as reflected in their defining ideals as homomorphic images of polynomial rings over R/I and R/m respectively. In case all the higher conormal modules of I are free over R/I, we observe that: (i) G(I) is Cohen-Macaulay iff F(I) is Cohen- Macaulay, (ii) G(I) is Gorenstein iff both F(I) and R/I are Gorenstein, and (iii) G(I) is a relative complete intersection iff F(I) is a relative complete intersection. In case R/I is Gorenstein, we give a necessary and sufficient condition for G(I) to be Gorenstein in terms of residuation of powers of I with respect to a reduction J of I with μ(J) = dim R and the reduction number r of I with respect to J. We prove that G(I) is Gorenstein iff J:Ir-i = J + Ii+1, for i = 0, ...,r-1. If (R,m) is a Gorenstein local ring and I ⊂eq m is an ideal having a reduction J with reduction number r such that μ(J) = ht(I) = g > 0, we prove that the extended Rees algebra R[It, t-1] is quasi-Gorenstein with -invariant a if and only if Jn:Ir = In+a-r+g-1 for every integer n.

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