Block algebras with HH1 a simple Lie algebra
Abstract
We show that if B is a block of a finite group algebra kG over an algebraically closed field k of prime characteristic p such that 1(B) is a simple Lie algebra and such that B has a unique isomorphism class of simple modules, then B is nilpotent with an elementary abelian defect group P of order at least 3, and 1(B) is in that case isomorphic to the Jacobson-Witt algebra 1(kP). In particular, no other simple modular Lie algebras arise as 1(B) of a block B with a single isomorphism class of simple modules.
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