Stability condition on a singular surface and its resolution
Abstract
Let X be a surface with an ADE-singularity and let X be its crepant resolution. In this paper, we show that there exists a Bridgeland stability condition σX on Db(X) and a weak stability condition σX on the derived category of the desingularisation Db(X), such that pushforward of σX-semistable objects are σX-semistable We first construct Bridgeland stability conditions on Db(X) associated to the contraction X X, generalizing the results of Tramel and Xia in TX22, Then we deform it to a weak stability condition σX and show that it descends to Db(X), producing the stability condition σX. Finally, we study the moduli spaces of σπ H,β,z, of σX, and of σX-semistable objects, and we show that the moduli spaces satisfy boundedness and openness, and hence are all Artin stacks of finite type over C.
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