|
| related topics |
| {equation, function, exp} |
| {temperature, thermal, energy} |
| {classical, space, random} |
| {phase, path, phys} |
| {energy, state, states} |
| {let, theorem, proof} |
|
Semiclassical Series from Path Integrals
C. A. A. de Carvalho, R. M. Cavalcanti
abstract: We derive the semiclassical series for the partition function in Quantum
Statistical Mechanics (QSM) from its path integral representation. Each term of
the series is obtained explicitly from the (real) minima of the classical
action. The method yields a simple derivation of the exact result for the
harmonic oscillator, and an accurate estimate of ground-state energy and
specific heat for a single-well quartic anharmonic oscillator. As QSM can be
regarded as finite temperature field theory at a point, we make use of Feynman
diagrams to illustrate the non-perturbative character of the series: it
contains all powers of $\hbar$ and graphs with any number of loops; the usual
perturbative series corresponds to a subset of the diagrams of the
semiclassical series. We comment on the application of our results to other
potentials, to correlation functions and to field theories in higher
dimensions.
- oai_identifier:
- oai:arXiv.org:quant-ph/9903028
- categories:
- quant-ph cond-mat.stat-mech hep-th
- comments:
- 18 pages, 4 figures. References updated
- doi:
- 10.1063/1.59667
- arxiv_id:
- quant-ph/9903028
- journal_ref:
- Trends in Theoretical Physics II (AIP Conference Proceedings 484),
edited by H. Falomir, R. E. Gamboa Saravi, and F. A. Schaposnik (American
Institute of Physics, Woodbury, 1999) pp 256-269
- created:
- 1999-03-08
- updated:
- 1999-11-08
Full article ▸
|
|
| related documents |
| 9606035v1 |
| 0404102v1 |
| 0604167v1 |
| 0012117v1 |
| 0609213v1 |
| 9901054v1 |
| 9905002v1 |
| 9902057v2 |
| 9602012v1 |
| 0004065v2 |
| 0211168v5 |
| 9604009v2 |
| 9910051v1 |
| 0211112v2 |
| 0302107v1 |
| 0303154v1 |
| 0509135v2 |
| 0601195v1 |
| 9611019v1 |
| 9912032v1 |
| 0301138v2 |
| 0602058v1 |
| 9505012v2 |
| 0310143v1 |
| 0006078v2 |
|