Cartan--Helgason theorem for quaternionic symmetric and twistor spaces

Abstract

Let (g, k) be a complex quaternionic symmetric pair with k having an ideal sl(2, C), k=sl(2, C)+mc. Consider the representation Sm(C2)=Cm+1 of k via the projection onto the ideal k sl(2, C). We study the finite dimensional irreducible representations V(λ) of g which contain Sm(C2) under k⊂eq g. We give a characterization of all such representations V(λ) and find the corresponding multiplicity m(λ,m)= Hom (V(λ)|k,Sm(C2)). We consider also the branching problem of V(λ) under l=u(1)C + mc⊂eq k and find the multiplicities. Geometrically the Lie subalgebra l⊂eq k defines a twistor space over the compact symmetric space of the compact real form Gc of GC, Lie(GC)=g, and our results give the decomposition for the L2-spaces of sections of certain vector bundles over the symmetric space and line bundles over the twistor space. This generalizes Cartan--Helgason's theorem for symmetric spaces (g, k) and Schlichtkrull's theorem for Hermitian symmetric spaces where one-dimensional representations of k are considered.