Abstract
Up to derived equivalence, the representation-finite self-injective algebras of class A n are divided into the wreath-like algebras (containing all Brauer tree algebras) and the Mobius algebras. In Part I (Forum Math. 11 (1999), 177–201), the ring structure of Hochschild cohomology of wreath-like algebras was determined, the key observation being that kernels in a minimal bimodule resolution of the algebras are twisted bimodules. In this paper we prove that also for Mobius algebras certain kernels in a minimal bimodule resolution carry the structure of a twisted bimodule. As an application we obtain detailed information on subrings of the Hochschild cohomology rings of Mobius algebras.
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