Remarks on the geometry of the extended Siegel--Jacobi upper half-plane

Abstract

The real Jacobi group GJ1(R)= SL(2,R) H1, where H1 denotes the 3-dimensional Heisenberg group, is parametrized by the S-coordinates (x,y,θ,p,q,). We show that the parameter η that appears passing from Perelomov's un-normalized coherent state vector based on the Siegel--Jacobi disk DJ1 to the normalized one is η=q+i p. The two-parameter invariant metric on the Siegel--Jacobi upper half-plane XJ1=GJ1()SO(2)×R is expressed in the variables (x,y,Re~η,Im~η). It is proved that the five dimensional manifold XJ1=GJ1()SO(2)≈XJ1×R, called extended Siegel--Jacobi upper half-plane, is a reductive, non-symmetric, non-naturally reductive manifold with respect to the three-parameter metric invariant to the action of GJ1(R), and its geodesic vectors are determined.