On finite dimensional representations of finite W-superalgebras
Abstract
Let g=g0+g1 be a basic Lie superalgebra, W0 (resp.W) be the finite W-(resp.super-) algebras constructed from a fixed nilpotent element in g0. Based on a relation between finite W-algebra W0 and W-superalgebra W found recently by the author and Shu, we study the finite dimensional representations of finite W-superalgebras in this paper. We first formulate and prove a version of Premet's conjecture for the finite W-superalgebras from basic simple Lie superalgebras. As in the W-algebra case, the Premet's conjecture is very close to give a classification to the finite dimensional simple W-modules. In the case of is Lie superalgebras of basic type 1, we prove the set of simple W-supermodules is bijective with that of simple W0-modules; presenting a triangular decomposition to the tensor product of W with a Clifford algebra, we also give an algorithm to compute the character of the finite dimensional simple W-supermodules with integral central character.
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