A convenient coordinatization of Siegel-Jacobi domains

Abstract

We determine the homogeneous K\"ahler diffeomorphism FC which expresses the K\"ahler two-form on the Siegel-Jacobi ball DJn=n× Dn as the sum of the K\"ahler two-form on n and the one on the Siegel ball Dn. The classical motion and quantum evolution on DJn determined by a hermitian linear Hamiltonian in the generators of the Jacobi group GJn=Hn(n,) are described by a matrix Riccati equation on Dn and a linear first order differential equation in z∈n, with coefficients depending also on W∈Dn. Hn denotes the (2n+1)-dimensional Heisenberg group. The system of linear differential equations attached to the matrix Riccati equation is a linear Hamiltonian system on Dn. When the transform FC:(η,W)→ (z,W) is applied, the first order differential equation in the variable η=(-WW)-1(z+Wz)∈n becomes decoupled from the motion on the Siegel ball. Similar considerations are presented for the Siegel-Jacobi upper half plane XJn=n×Xn, where Xn denotes the Siegel upper half plane.