Semi-classical formula beyond the Ehrenfest time in quantum chaos. (I) Trace formula

Faure, Frédéric

Semi-classical formula beyond the Ehrenfest time in quantum chaos. (I) Trace formula
[Formules semi-classiques au-delà du temps d’Erhenfest en chaos quantique. (I) La formule des traces.]

Faure, Frédéric

Annales de l'Institut Fourier, Tome 57 (2007), p. 2525-2599 / Harvested from Numdam

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Abstract

On considère une application $M$ , Anosov non linéaire qui conserve l’aire sur le tore $T^{2}$ . C’est un des exemples les plus simples d’une dynamique chaotique. On s’intéresse à la dynamique quantique pour les temps longs, générée par un opérateur unitaire $\hat{M}$ . La formule des traces semi-classique habituelle exprime $T r ({\hat{M}}^{t})$ pour $t$ fini, dans la limite $ℏ \to 0$ , en termes d’orbites périodiques de $M$ de période $t$ . Des travaux récents atteignent des temps $t ≪ t_{E} / 6$ où $t_{E} = log (1 / ℏ) / λ$ est le temps d’Ehrenfest, et $λ$ est le coefficient de Lyapounov. En utilisant une description uniforme de la dynamique au moyen d’une forme normale semi-classique, nous montrons comment étendre la formule des traces pour des temps plus longs, de la forme $t = C . t_{E}$ , où $C$ est une constante arbitraire, et avec une erreur arbitrairement petite.

We consider a nonlinear area preserving Anosov map $M$ on the torus phase space, which is the simplest example of a fully chaotic dynamics. We are interested in the quantum dynamics for long time, generated by the unitary quantum propagator $\hat{M}$ . The usual semi-classical Trace formula expresses $T r ({\hat{M}}^{t})$ for finite time $t$ , in the limit $ℏ \to 0$ , in terms of periodic orbits of $M$ of period $t$ . Recent work reach time $t ≪ t_{E} / 6$ where $t_{E} = log (1 / ℏ) / λ$ is the Ehrenfest time, and $λ$ is the Lyapounov coefficient. Using a semi-classical normal form description of the dynamics uniformly over phase space, we show how to extend the trace formula for longer time of the form $t = C . t_{E}$ where $C$ is any constant, with an arbitrary small error.

Publié le : 2007-01-01

MR 2394550 | Zbl 1145.81035 | 1 citation dans Numdam

DOI : https://doi.org/10.5802/aif.2341
Classification: 81Q50, 37D20
Mots clés: chaos quantique, application hyperbolique, formule des traces semi-classique, temps d’Ehrenfest

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     title = {Semi-classical formula beyond the Ehrenfest time in quantum chaos. (I) Trace formula},
     journal = {Annales de l'Institut Fourier},
     volume = {57},
     year = {2007},
     pages = {2525-2599},
     doi = {10.5802/aif.2341},
     zbl = {1145.81035},
     mrnumber = {2394550},
     language = {en},
     url = {http://dml.mathdoc.fr/item/AIF_2007__57_7_2525_0}
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Faure, Frédéric. Semi-classical formula beyond the Ehrenfest time in quantum chaos. (I) Trace formula. Annales de l'Institut Fourier, Tome 57 (2007) pp. 2525-2599. doi : 10.5802/aif.2341. http://gdmltest.u-ga.fr/item/AIF_2007__57_7_2525_0/

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