Holomorphic discrete series for the real symplectic group

Let G be a connected real semisimple Lie group which contains a compact Cartan subgroup such that it has non-empty discrete series. A holomorphic discrete model of G is a unitary G-representation consisting of all its holomorphic discrete series with multiplicity one. We perform geometric quantizati

We prove a theorem for the tensor product of representations of the holomorphic discrete series analogous to the classical theorem of Clebsch-Gordan and give an asymptotic formula for corresponding 'coefficients of Clebsch-Gordan.' For small groups we compute the coefficients explicitly.

A family of holomorphic discrete series representations of SU p,q is studied, and analytic continuation in terms of the reproducing kernel parameter ν is discussed. The composition series of the module of all polynomials on the hermitian symmetric domain D z of SU p,q is determined for those values

Let xn+1 = exp(A + uB)xn be a discrete-time control system on R 2n with A and B matrices in the symplectic Lie algebra sp(n; R). This paper gives su cient conditions for the global controllability of the system. These conditions are similar to those of Martin (Math. Control Signal Systems 8 (1995) 2