Quantum-classical Correspondence of Regular Motion of Integrable Systems and Related Problems
doi: 10.11804/NuclPhysRev.18.04.201
- Received Date: 1900-01-01
- Rev Recd Date: 1900-01-01
- Publish Date: 2001-12-20
Abstract: Based on the dynamical symmetry group characterizing the integrability of classical as well as quantum mechanics, quantum dynamics with proper initial conditions was genuinely formulated, and analytical solutions in the form of soliton-like state evolving around a certain invariant torus were obtained. It has been shown that, in case the intrinsic size of the evolving quantum state is significantly smaller than the extent of its evolving orbit, the motion can be satisfactorily treated with...
Citation: | XU Gong-ou, YANG Ya-tian, XU Ming-jie. Quantum-classical Correspondence of Regular Motion of Integrable Systems and Related Problems[J]. Nuclear Physics Review, 2001, 18(4): 201-205. doi: 10.11804/NuclPhysRev.18.04.201 |