Whittaker modules and representations of finite W-algebras of queer Lie superalgebras

Abstract

We study various categories of Whittaker modules over the queer Lie superalgebras q(n). We formulate standard Whittaker modules and reduce the problem of composition factors of these standard Whittaker modules to that of Verma modules in the BGG categories O of q(n). We also obtain an analogue of Losev-Shu-Xiao decomposition for the finite W-superalgebras U( q(n), E) of q(n) associated to an odd nilpotent element E∈ q(n)1. As an application, we establish several equivalences of categories of Whittaker q(n)-modules and analogues of BGG category of U( q(n), E)-modules. In particular, we reduce the multiplicity problem of Verma modules over U( q(n), E) to that of the Verma modules in the BGG categories O of q(n).

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