Equivariant categories of symplectic surfaces and fixed loci of Bridgeland moduli spaces

Abstract

Given an action of a finite group G on the derived category of a smooth projective variety X we relate the fixed loci of the induced G-action on moduli spaces of stable objects in Db(Coh(X)) with moduli spaces of stable objects in the equivariant category Db(Coh(X))G. As an application we obtain a criterion for the equivariant category of a symplectic action on the derived category of a symplectic surface to be equivalent to the derived category of a surface. This generalizes the derived McKay correspondence, and yields a general framework for describing fixed loci of symplectic group actions on moduli spaces of stable objects on symplectic surfaces.