Symplectic branching laws and Hermitian symmetric spaces

Abstract

Let G be a complex simple Lie group, and let U ⊂eq G be a maximal compact subgroup. Assume that G admits a homogenous space X=G/Q=U/K which is a compact Hermitian symmetric space. Let L → X be the ample line bundle which generates the Picard group of X. In this paper we study the restrictions to K of the family (H0(X, Lk))k ∈ of irreducible G-representations. We describe explicitly the moment polytopes for the moment maps X → * associated to positive integer multiples of the Kostant-Kirillov symplectic form on X, and we use these, together with an explicit characterization of the closed K-orbits on X, to find the decompositions of the spaces H0(X,Lk). We also construct a natural Okounkov body for L and the K-action, and identify it with the smallest of the moment polytopes above. In particular, the Okounkov body is a convex polytope. In fact, we even prove the stronger property that the semigroup defining the Okounkov body is finitely generated.