Sandwich elements and the Richardson property
Abstract
Let L be finite dimensional restricted Lie algebra over an algebraically closed field k of characteritic p>3. A finite dimensional restricted L-module V is called Richardson if V is faithful and there exists a subspace R of gl(V) such that [L,R]⊂eq R and gl(V)=L R, where we identify L with its image in gl(V). In this paper we show that if L admits an irreducible Richardson module then it is isomorphic (as a restricted Lie algebra) to the Lie algebra of a reductive k-group.
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