Centralizers of nilpotent elements in basic classical Lie superalgebras in good characteristic

Abstract

Let g=g0g1 be a basic classical Lie superalgebra over an algebraically closed field K whose characteristic p>0 is a good prime for g. Let G0 be the reductive algebraic group over K such that Lie(G0)=g0. Suppose e∈g0 is nilpotent. Write ge for the centralizer of e in g and z(ge) for the centre of ge. We calculate a basis for ge and z(ge) by using associated cocharacters τ:K×→ G0 of e. In addition, we give the classification of e which are reachable, strongly reachable or satisfy the Panyushev property for exceptional Lie superalgebras D(2,1;α), G(3) and F(4).