Fusion-stable structures on triangulated categories
Abstract
Let G be a fusion category acting on a triangulated category D, in the sense that D is a G-module category. Our motivation example is fusion-weighted species, which is essentially Heng's construction. We study G-stable tilting, cluster and stability structures on D. In particular, we prove the deformation theorem for G-stable stability conditions. A first application is that Duffield-Tumarkin's categorification of cluster exchange graphs of finite Coxeter-Dynkin type can be naturally realized as fusion-stable cluster exchange graphs. Another application is that the universal cover of the hyperplane arrangements of any finite Coxeter-Dynkin type can be realized as the space of fusion-stable stability conditions for certain ADE Dynkin quiver. This provides an alternative uniform proof of K(π,1)-conjecture in the finite Coxeter-Dynkin case.
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