Categorical resolutions of cuspidal singularities

Abstract

Let X be a projective variety with an isolated A2 singularity. We study its bounded derived category and prove that there exists a crepant categorical resolution π* D Db(X), which is a Verdier localization. More importantly, we give an explicit description of a generating set for its kernel. In the case of an even dimensional variety with a single A2 singularity, we prove that this generating set is given by two 2-spherical objects. If X is a cubic fourfold with an isolated A2 singularity, we show that this resolution restricts to a crepant categorical resolution AX of the Kuznetsov component AX ⊂ Db(X), which is equivalent to the bounded derived category of a K3 surface.

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