Mukai Duality for abelian stacks

Abstract

An abelian stack is a stacky generalization of an abelian variety that was introduced by Brochard. Just as an abelian variety has a dual, an abelian stack A has a dual D(A) which generalizes the classical dual. In general, D(A) is no longer an abelian stack but a commutative group scheme which is an extension of a finite, flat, and finitely presented commutative group scheme by an abelian scheme. We show that Fourier-Mukai duality holds for tame abelian stacks and their duals. Our approach is as follows. Let QC∞(A) be the stable infinity category of quasi-coherent sheaves on A. We define a Poincare bundle on A× D(A) and use this to show that QC∞(A) and QC∞(D(A)) are dual as objects in the infinity category of stable infinity categories. By a result of Ben-Zvi,Francis and Nadler we have that QC∞(A) is self dual, giving that QC∞(A) QC∞(D(A)) which gives the statement for the derived categories. In addition we give new examples of tame abelian stacks.

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