A combinatorial interpretation of the Bernstein degree of unitary highest weight modules

Abstract

The Bernstein degree (Deg) is a fundamental invariant of admissible representations of a real reductive Lie group GR. Our main result concerns the classical dual pairs (GR, HR(k)), namely (U(p,q), \: U(k)), (Mp(2n, R), \: O(k)), and (O*(2n), \: Sp(k)), where k is any positive integer. In this setting, via Howe duality, each irreducible representation σ of HR(k) corresponds to a unitary highest weight module Lλ(σ) for GR. A landmark result of Nishiyama-Ochiai-Taniguchi (2001) expressed Deg Lλ(σ) as a product of two quantities: the dimension of σ and the degree of the associated variety. However, this result was limited to a specific range of the parameter k (namely k ≤ r, the real rank of GR). The present paper resolves this limitation by introducing, for all k, the combinatorial interpretation Deg Lλ(σ) = \#( Qk(σ) × Pk), where Qk(σ) is a certain set of semistandard tableaux and Pk is a set of plane partitions. (The result remains partly conjectural in the Mp(2n, R) case.) Beyond the dual pair setting, we generalize the set Pk to all groups GR of Hermitian type, and we exhibit analogues of the Nishiyama-Ochiai-Taniguchi result for certain families of unitary highest weight modules of E6 and E7.

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