Maslov indices in the Gutzwiller trace formula
- 1 May 1991
- journal article
- Published by IOP Publishing in Nonlinearity
- Vol. 4 (2) , 343-363
- https://doi.org/10.1088/0951-7715/4/2/007
Abstract
The Gutzwiller trace formula is a semi-classical approximation for the density of states of a bound quantum system, expressed in terms of a sum over periodic orbits of the corresponding classical system. The authors establish the existence of a topological invariant associated with classical periodic orbits, namely the winding number of their invariant manifolds, and show that this winding number is precisely the index which appears in the trace formula. The proof is valid in any number of dimensions. Explicit formulae for the index are given.Keywords
This publication has 22 references indexed in Scilit:
- A rule for quantizing chaos?Journal of Physics A: General Physics, 1990
- Periodic-orbit quantization of chaotic systemsPhysical Review Letters, 1989
- Semiclassical theory of spectral rigidityProceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences, 1985
- Semiclassical theory of Bound StatesAdvances in Chemical Physics, 1977
- Distribution of eigenfrequencies for the wave equation in a finite domain: III. Eigenfrequency density oscillationsAnnals of Physics, 1972
- Asymptotic evaluation of the Green's function for large quantum numbersAnnals of Physics, 1971
- Distribution of eigenfrequencies for the wave equation in a finite domainAnnals of Physics, 1970
- Energy Spectrum According to Classical MechanicsJournal of Mathematical Physics, 1970
- Phase-Integral Approximation in Momentum Space and the Bound States of an Atom. IIJournal of Mathematical Physics, 1969
- Phase-Integral Approximation in Momentum Space and the Bound States of an AtomJournal of Mathematical Physics, 1967