Semiclassical calculation of bound states in multidimensional systems with Fermi resonance
- 1 October 1979
- journal article
- research article
- Published by AIP Publishing in The Journal of Chemical Physics
- Vol. 71 (7), 2864-2873
- https://doi.org/10.1063/1.438677
Abstract
A method is devised to calculate eigenvalues semiclassically for an anharmonic system whose two unperturbed modes are 2:1 degenerate. For some special states the periodic energy exchange between unperturbed modes is found to be very large. The quantum mechanical wave functions are examined and a correlation with the classical trajectories is described, both for quasiperiodic and the stochastic cases. A method used in the literature for calculating the stochastic limit is tested and found to break down when the present anharmonic system is separable.Keywords
This publication has 28 references indexed in Scilit:
- Semi-classical methods for vibrational energy levels of triatomic moleculesFaraday Discussions of the Chemical Society, 1977
- Semiclassical theory of Bound StatesAdvances in Chemical Physics, 1977
- Nonlinear resonance and stochasticity in intramolecular energy exchangeThe Journal of Chemical Physics, 1976
- Vibrational quantization of polyatomic moleculesMolecular Physics, 1976
- Stochastic transition in the unequal-mass Toda latticePhysical Review A, 1975
- Semiclassical theory for collisions involving complexes (compound state resonances) and for bound state systemsFaraday Discussions of the Chemical Society, 1973
- Stochastic and Adiabatic Behavior of Particles Accelerated by Periodic ForcesPhysical Review A, 1972
- Stochastic Behavior of Resonant Nearly Linear Oscillator Systems in the Limit of Zero Nonlinear CouplingPhysical Review A, 1970
- Corrected bohr-sommerfeld quantum conditions for nonseparable systemsAnnals of Physics, 1958
- ber den Ramaneffekt des KohlendioxydsThe European Physical Journal A, 1931