Plancherel formula for Berezin deformation of L2 on Riemannian symmetric space

Abstract

Consider the space B of complex p× q matrces with norm <1. There exists a standard one-parameter family Sa of unitary representations of the pseudounitary group U(p,q) in the space of holomorphic functions on B (i.e. scalar highest weight representations). Consider the restriction Ta of Sa to the pseudoorthogonal group O(p,q). The representation of O(p,q) in L2 on the symmetric space O(p,q)/O(p)× O(q) is a limit of the representations Ta in some precise sence. Spectrum of a representation Ta is comlicated and it depends on α. We obtain the complete Plancherel formula for the representations Ta for all admissible values of the parameter α. We also extend this result to all classical noncompact and compact Riemannian symmetric spaces.

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