Bergman representative coordinates on the Siegel-Jacobi disk

Abstract

We underline some differences between the geometric aspect of Berezin's approach to quantization on homogeneous K\"ahler manifolds and Bergman's construction for bounded domains in Cn. We construct explicitly the Bergman representative coordinates for the Siegel-Jacobi disk DJ1, which is a partially bounded manifold whose points belong to C×D1, where D1 denotes the Siegel disk. The Bergman representative coordinates on DJ1 are globally defined, the Siegel-Jacobi disk is a normal K\"ahler homogeneous Lu Qi-Keng manifold, whose representative manifold is the Siegel-Jacobi disk itself.