Local inequalities for cAk singularities
Abstract
We generalize an intersection-theoretic local inequality of Fulton-Lazarsfeld to weighted blowups. As a consequence, we obtain the 4n2/(k+1)-inequality for isolated cAk singularities, an analogue of the 4 n2-inequality for smooth points. We use this to prove birational rigidity of many families of Fano 3-fold weighted complete intersections with terminal quotient singularities and isolated cAk singularities, including sextic double solids with cA1 and ordinary cA2 points.
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