Andr\'e-Quillen homology of Rees algebras and extended Rees algebras

Abstract

Let (A,m) be an excellent local complete intersection ring and let I = (a1, …, ar) be an ideal of positive height. Let R(I) = A[It] be the Rees algebra of I. Consider the map S = A[X1, …, Xr] → R(I) which maps Xi ait for all i. Let J = and let H*(J) be the Koszul homology of J. We prove that the following assertions are equivalent: (i) Proj \ R(I) is a complete intersection. (ii) (a) D3(R(I)|A, R(I))n = 0 for n 0 and, (ii) (b) For P ∈ Proj \ R(I) we have H1(J)P is a free R(I)P-module. Here D3(R(I)|A, R(I)) is the third Andr\'e-Quillen homology of R(I) with respect to A → R(I). We prove an analogous result for the extended Rees algebra R = A[It, t-1]. When A is a Cohen-Macaulay domain (not necessarily a complete intersection) we compute that rank of H1(J) and hence compute its free locus.

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