Computation of Weighted Bergman Inner Products on Bounded Symmetric Domains and Restriction to Subgroups

Abstract

Let (G,G1) be a symmetric pair of holomorphic type, and we consider a pair of Hermitian symmetric spaces D1=G1/K1⊂ D=G/K, realized as bounded symmetric domains in complex vector spaces p+1⊂p+ respectively. Then the universal covering group G of G acts unitarily on the weighted Bergman space Hλ(D)⊂O(D) on D. Its restriction to the subgroup G1 decomposes discretely and multiplicity-freely, and its branching law is given explicitly by Hua-Kostant-Schmid-Kobayashi's formula in terms of the K1-decomposition of the space P(p+2) of polynomials on the orthogonal complement p+2 of p+1 in p+. The object of this article is to compute explicitly the inner product f(x2), e(x|z)p+λ for f(x2)∈P(p+2), x=(x1,x2), z∈p+=p+1p+2. For example, when p+, p+2 are of tube type and f(x2)=(x2)k, we compute this inner product explicitly by introducing a multivariate generalization of Gauss' hypergeometric polynomials 2F1. Also, as an application, we construct explicitly G1-intertwining operators (symmetry breaking operators) Hλ(D)|G1μ(D1) from holomorphic discrete series representations of G to those of G1, which are unique up to constant multiple for sufficiently large λ.