V. S. Matveev, P. Ĭ. Topalov, “Geodesical equivalence and the Liouville integration of the geodesic flows”, Regul. Chaotic Dyn., 1998, Volume 3, Issue 2,Pages <nobr>30

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Geodesical equivalence and the Liouville integration of the geodesic flows

V. S. Matveev^a, P. Ĭ. Topalov^b

^a Max-Planck-Institute f. Mathematik, Gottfried-Claren-Strasse 26, 53225 Bonn
^b Institute of Mathematics and Informatics, BAS, Acad. G.Bonchev Str., bl. 8, Sofia, 1113, Bulgaria

Abstract: We suggest a simple approach for obtaining integrals of Hamiltonian systems if there is known a trajectorian map of two Hamiltonian systems. An explicite formila is given. As an example, it is proved that if on a manifold are given two Riemannian metrics which are geodesically equivalent then there is a big family of integrals. Our theorem is a generalization of the well-known Painleve–Liouville theorems.

MSC: 58F17, 53C22

Received: 02.02.1998

Language: English

DOI: 10.1070/RD1998v003n02ABEH000069