Email this article Persistence of regular motions for nearly integrable Hamiltonian systems in the thermodynamic limit
- Authors: Carati A.1, Galgani L.1, Maiocchi A.1, Gangemi F.2, Gangemi R.2
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Affiliations:
- Department of Mathematics
- DMMT
- Issue: Vol 21, No 6 (2016)
- Pages: 660-664
- Section: On the 70th Birthday of Nikolai N. Nekhoroshev Special Memorial Issue. Part 1
- URL: https://ogarev-online.ru/1560-3547/article/view/218408
- DOI: https://doi.org/10.1134/S156035471606006X
- ID: 218408
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Abstract
A review is given of the studies aimed at extending to the thermodynamic limit stability results of Nekhoroshev type for nearly integrable Hamiltonian systems. The physical relevance of such an extension, i. e., of proving the persistence of regular (or ordered) motions in that limit, is also discussed. This is made in connection both with the old Fermi–Pasta–Ulam problem, which gave origin to such discussions, and with the optical spectral lines, the existence of which was recently proven to be possible in classical models, just in virtue of such a persistence.
About the authors
Andrea Carati
Department of Mathematics
Author for correspondence.
Email: andrea.carati@unimi.it
Italy, Via Saldini 50, Milano, I-20133
Luigi Galgani
Department of Mathematics
Email: andrea.carati@unimi.it
Italy, Via Saldini 50, Milano, I-20133
Alberto Maiocchi
Department of Mathematics
Email: andrea.carati@unimi.it
Italy, Via Saldini 50, Milano, I-20133
Fabrizio Gangemi
DMMT
Email: andrea.carati@unimi.it
Italy, Viale Europa 11, Brescia, I-25123
Roberto Gangemi
DMMT
Email: andrea.carati@unimi.it
Italy, Viale Europa 11, Brescia, I-25123
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