Supercharacters of queer Lie superalgebras
Abstract
Let g= g 0 g 1 be the queer Lie superalgebra and let L be a finite-dimensional non-trivial irreducible g-module. Restricting the g-action on L to g 0, we show that the space of g 0-invariants L g 0 is trivial. As a consequence we establish a conjecture first formulated by Gorelik, Grantcharov and Mazorchuk on the triviality of the supercharacter of irreducible g-modules in the case when the modules are finite dimensional.
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