Stability conditions on noncommutative crepant resolutions of 3-dimensional isolated singularities

Abstract

Let R be a 3-dimensional complete local Gorenstein isolated singularity. For a basic maximal modifying R-module M, we construct a wall-and-chamber structure, denoted by Cone(M) and called the mutation cone of M, in the real Grothendieck group associated to the maximal modification algebra = EndR(M). Each chamber in Cone(M) corresponds to a maximal modifying module obtained by iterated (Iyama--Wemyss) mutations of M, and a wall-crossing corresponds to the mutation at an indecomposable summand. Moreover, we introduce the notion of tilting-noetherian property of , and by analysis of wall-and-chamber structure of Cone(M), we prove that this property holds for if and only if all maximal modifying R-modules are connected by iterated mutations. We then consider the finite length subcategory DM⊂ D b( mod\,) and introduce a full-dimensional connected subspace Stab mdfDM⊂ StabDM of Bridgeland stability conditions on DM. We prove that there is a regular covering map from Stab mdfDM to the complexification Cone(M)C of the mutation cone of M, where the Galois group is the subgroup of Auteq DM consisting of compositions of equivalences associated to mutations of maximal modifying modules. Finally, using the results on stability conditions, we describe the group of autoequivalences of DM that preserve the subspace Stab mdfDM.

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