Itoh's conjecture for normal ideals
Abstract
Let (A,m) be an analytically unramified Cohen-Macaulay local ring and let a be an m-primary ideal in A. If I is an ideal in A then let I* be the integral closure of I in A. Let Ga(A)* = n≥ 0 (an)*/(an+1)* be the associated graded ring of the integral closure filtration of a. Itoh conjectured that if e3a*(A) = 0 and A is Gorenstein then Ga(A)* is Cohen-Macaulay. In this paper we prove an important case of Itoh's conjecture: we show that if A is Cohen-Macaulay and if a is normal (i.e., an is integrally closed for all n ≥ 1) with e3a(A) = 0 then Ga(A) is Cohen-Macaulay.
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