Gorenstein Normal tangent cones of integrally closed ideals in two-dimensional normal singularities
Abstract
Let (A, m) be a two-dimensional excellent normal Gorenstein local domain containing an algebraically closed filed. Let I =H0(X,OX(-Z)) ⊂ A be an m-primary integrally closed ideal represented by an anti-nef cycle Z on some resolution X Spec A. In this paper, we prove that G(I) is Gorenstein if and only if it is Cohen-Macaulay and (r-1)Z2+KXZ=0, where r=r(I) denotes the normal reduction number of I and KX denotes the canonical divisor on X.
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