Computation of weighted Bergman inner products on bounded symmetric domains and restriction to subgroups II

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 construct explicitly G1-intertwining operators (symmetry breaking operators) Hλ(D)|G1_1λ(D1,Pk(p+2)) from holomorphic discrete series representations of G to those of G1, which are unique up to constant multiple for sufficiently large λ. These operators are given by differential operators whose symbols are computed as the inner products of polynomials on p+2. In this article, we treat the case p+,p+2 are both simple of tube type and rankp+=rankp+2. When rankp+=3, we treat all partitions k, and when rankp+ is general, we treat partitions of the form k=(k,…,k,k-l).