Wehrl inequalities for matrix coefficients of holomorphic discrete series

Abstract

We prove Wehrl-type L2(G)-Lp(G) inequalities for matrix coefficients of vector-valued holomorphic discrete series of G, for even integers p=2n. The optimal constant is expressed in terms of Harish-Chandra formal degrees for the discrete series. We prove the maximizers are precisely the reproducing kernels.

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