Derived Picard groups of symmetric representation-finite algebras of type D

Abstract

We explicitly describe the derived Picard groups of symmetric representation-finite algebras of type D. In particular, we prove that these groups are generated by spherical twists along collections of 0-spherical objects, the shift and autoequivalences which come from outer automorphisms of a particular representative of the derived equivalence class. The arguments we use are based on the fact that symmetric representation-finite algebras are tilting-connected. To apply this result we in particular develop a combinatorial-geometric model for silting mutations in type D, generalising the classical concepts of Brauer trees and Kauer moves. Another key ingredient in the proof is the faithfulness of the braid group action via spherical twists along D-configurations of 0-spherical objects.

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