Coherent states and geometry on the Siegel-Jacobi disk

Abstract

The coherent state representation of the Jacobi group GJ1 is indexed with two parameters, μ (=1), describing the part coming from the Heisenberg group, and k, characterizing the positive discrete series representation of SU(1,1). The Ricci form, the scalar curvature and the geodesics of the Siegel-Jacobi disk DJ1 are investigated. The significance in the language of coherent states of the transform which realizes the fundamental conjecture on the Siegel-Jacobi disk is emphasized. The Berezin kernel, Calabi's diastasis, the Kobayashi embedding, and the Cauchy formula for the Sigel-Jacobi disk are presented.