Abstract
The concept of integrability of a quantum system is developed and studied. By formulating the concepts of quantum degree of freedom and quantum phase space, a realization of the dynamics is achieved. For a quantum system with a dynamical group G in one of its unitary irreducible representative carrier spaces, the quantum phase space is a finite topological space. It is isomorphic to a coset space G/R by means of the unitary exponential mapping, where R is the maximal stability subgroup of a fixed state in the carrier space. This approach has the distinct advantage of exhibiting consistency between classical and quantum integrability. The formalism will be illustrated by studying several quantum systems in detail after this development.
Reference24 articles.
1. Baker GL Gollub JP. Chaotic Dynamics. Cambridge: Cambridge University Press 1990
2. Ott E. Chaos in Dynamical Systems. Cambridge: Cambridge University Prees 1993
3. Eckhart B. Quantum Mechanics of Classically Non-Integrable Systems. Phys Rep 1988; 163: 205–297
4. Arnold VI. Mathematical Methods of Classical Mechanics. Springer, New York. 1978
5. Giannoni MJ, Voros A, Zinn-Justin J. eds. Chaos and Quantum Physics. Les Houches, Session LII. Amsterdam, North Holland. 1991
Cited by
1 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献