On the graded singularity category of Abelian quotient singularities, I. Smooth categorical compactification

Abstract

Given a singularity which is the quotient of an affine space V by a finite Abelian group G ⊂eq SL(V), we study the DG enhancement Db(tails(k[V]G)) of the bounded derived category of the non-commutative projective space tails(k[V]G) and the DG enhancement DsgZ(k[V]G) of its graded singularity category. In this paper, we construct smooth categorical compactifications, in the sense of Efimov, of Db(tails(k[V]G)) and DsgZ(k[V]G) respectively, via the non-commutative crepant resolution of k[V]G. We give explicit constructions of canonical classical generators in the kernels of such compactifications.