Tau Signatures and Characters of Weyl Groups
Abstract
Let G R be the set of real points of a complex linear reductive group and Gλ its classes of irreducible admissible representations with infinitesimal integral regular character λ. In this case each cell of representations is associated to a special nilpotent orbit. This helps organize the corresponding set of irreducible Harish-Chandra modules. The goal of this paper is to is to describe algorithms for identifying the special nilpotent orbit attached to a cell in terms of descent sets appearing in the cell.
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