The topology of integrable systems with incomplete fields

The topology of integrable systems with incomplete fields

Liouville's theorem holds for Hamiltonian systems with complete Hamiltonian fields which possess a complete involutive system of first integrals; such systems are called Liouville-integrable. In this paper integrable systems with incomplete Hamiltonian fields are investigated. It is shown that...

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Veröffentlicht in:Sbornik. Mathematics 2014-01, Vol.205 (9), p.1264-1278
1. Verfasser: Aleshkin, K. R.
Format: Artikel
Sprache:eng
Schlagworte:
ALGEBRA
Analogue
HAMILTONIANS
incomplete fields
integrable systems
INTEGRAL CALCULUS
INTEGRALS
Lie algebras
LIOUVILLE THEOREM
Liouville's theorem
Mathematical analysis
MATHEMATICAL METHODS AND COMPUTING
MATHEMATICAL SOLUTIONS
SL GROUPS
Theorems
TOPOLOGY
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Beschreibung
Zusammenfassung:Liouville's theorem holds for Hamiltonian systems with complete Hamiltonian fields which possess a complete involutive system of first integrals; such systems are called Liouville-integrable. In this paper integrable systems with incomplete Hamiltonian fields are investigated. It is shown that Liouville's theorem remains valid in the case of a single incomplete field, while if the number of incomplete fields is greater, a certain analogue of the theorem holds. An integrable system on the algebra is taken as an example. Bibliography: 11 titles.
ISSN:1064-5616
1468-4802
DOI:10.1070/SM2014v205n09ABEH004417