Centers of centralizers of nilpotent elements in exceptional Lie superalgebras
Abstract
Let g=g0g1 be a finite-dimensional simple Lie superalgebra of type D(2,1;α), G(3) or F(4) over C. Let G be the simply connected semisimple algebraic group over C such that Lie(G)=g0. Suppose e∈g0 is nilpotent. We describe the centralizer ge of e in g and its centre z(ge) especially. We also determine the labelled Dynkin diagram for e. We prove theorems relating the dimension of (z(ge))Ge and the labelled Dynkin diagram.
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