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

Published 26 Mar 2014 in math.DG | (1403.6594v1)

Abstract: We show that the Wei-Norman method applied to describe the evolution on the Siegel-Jacobi disk $\mathcal{D}J_1=\mathcal{D}_1\times\mathbb{C}1$, where $\mathcal{D}1$ denotes the Siegel disk, determined by a hermitian Hamiltonian linear in the generators of the Jacobi group $GJ_1$ 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 $\omega{\mathcal{D}J_1} $ can be written as $\omega_{\mathcal{D}J_1}=\omega_{\mathcal{D}1}+\omega{\mathbb{C}1}$. The Wei-Norman equations on $\mathcal{D}J_1$ are a particular case of equations of motion on the Siegel-Jacobi ball $\mathcal{D}J_n$ generated by a hermitian Hamiltonian linear in the generators of the Jacobi group $GJ_n$ obtained in Berezin's approach based on coherent states on $\mathcal{D}J_n$.

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