Construction of Intertwining Operators between Holomorphic Discrete Series Representations

Abstract

In this paper we explicitly construct G1-intertwining operators between holomorphic discrete series representations H of a Lie group G and those H1 of a subgroup G1⊂ G when (G,G1) is a symmetric pair of holomorphic type. More precisely, we construct G1-intertwining projection operators from H onto H1 as differential operators, in the case (G,G1)=(G0× G0, G0) and both H, H1 are of scalar type, and also construct G1-intertwining embedding operators from H1 into H as infinite-order differential operators, in the case G is simple, H is of scalar type,and H1 is multiplicity-free under a maximal compact subgroup K1⊂ K. In the actual computation we make use of series expansions of integral kernels and the result of Faraut-Korányi (1990) or the author's previous result (2016) on norm computation. As an application, we observe the behavior of residues of the intertwining operators, which define the maps from some subquotient modules, when the parameters are at poles.