Fusion-equivariant stability conditions and Morita duality
Abstract
Given a triangulated category D with an action of a fusion category C, we study the moduli space StabC(D) of fusion-equivariant Bridgeland stability conditions on D. The main theorem is that the fusion-equivariant stability conditions form a closed, complex submanifold of the moduli space of stability conditions on D. As an application of this framework to finite group actions on categories, we generalise a result of Macr\`i--Mehrotra--Stellari by establishing a biholomorphism between the space of G-invariant stability conditions on D and the space of rep(G)-equivariant stability conditions on the equivariant category DG. We also describe applications to the study of stability conditions associated to McKay quivers and to geometric stability conditions on free quotients of smooth projective varieties.
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