Nearly Gorenstein rational surface singularities
Abstract
In this paper, we show that for any rational surface singularity A, the canonical trace ideal TrA(KA) is integrally closed ideal which is represented by the minimal anti-nef cycle F on the minimal resolution of singularities so that KX+F is anti-nef. Then F Z if A is not Gorenstein, where Z is the fundamental cycle. As a result, we give a criterion for rational surface singularity A to be nearly Gorenstein. Moreover, we classify all nearly Gorenstein rational singularities in terms of resolution of singularities in the following cases: (a) the fundamental cycle Z is almost reduced; (b) quotient singularity.
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