Exact solutions of time-dependent three-generator systems
Abstract
There exist a number of typical and interesting systems or models which possess three-generator Lie-algebraic structure in atomic physics, quantum optics, nuclear physics and laser physics. The well-known fact that all simple 3-generator algebras are either isomorphic to the algebra or to one of its real forms enables us to treat these time-dependent quantum systems in a unified way. By making use of the Lewis-Riesenfeld invariant theory and the invariant-related unitary transformation formulation, the present paper obtains exact solutions of the time-dependent Schr\"{o}dinger equations governing various three-generator quantum systems. For some quantum systems whose time-dependent Hamiltonians have no quasialgebraic structures, we show that the exact solutions can also be obtained by working in a sub-Hilbert-space corresponding to a particular eigenvalue of the conserved generator (i.e., the time-independent invariant that commutes with the time-dependent Hamiltonian). The topological property of geometric phase factors in time-dependent systems is briefly discussed.
Cite
@article{arxiv.quant-ph/0205170,
title = {Exact solutions of time-dependent three-generator systems},
author = {Jian-Qi Shen and Hong-Yi Zhu and Pan Chen},
journal= {arXiv preprint arXiv:quant-ph/0205170},
year = {2007}
}
Comments
16 pages,no figer