Wei-Norman and Berezin's equations of motion on the Siegel-Jacobi disk

Abstract

We show that the Wei-Norman method applied to describe the evolution on the Siegel-Jacobi disk DJ1=D1×C1, where D1 denotes the Siegel disk, determined by a hermitian Hamiltonian linear in the generators of the Jacobi group GJ1 and Berezin's scheme using coherent states give the same equations of quantum and classical motion when are expressed in the coordinates in which the K\"ahler two-form ωDJ1 can be written as ωDJ1=ωD1+ωC1. The Wei-Norman equations on DJ1 are a particular case of equations of motion on the Siegel-Jacobi ball DJn generated by a hermitian Hamiltonian linear in the generators of the Jacobi group GJn obtained in Berezin's approach based on coherent states on DJn.