This article is cited in 4 papers

Mathematics

Liouville classification of integrable geodesic flows on a torus of revolution in a potential field

D. S. Timonina

Lomonosov Moscow State University, Faculty of Mechanics and Mathematics

Abstract: A Liouville classification of integrable Hamiltonian systems being geodesic flows on a 2-dimensional torus of revolution in an invariant potential field in the case of linear integral is obtained. This classification is obtained using the Fomenko–Zieschang invariant (marked molecules) of studied systems. All types of bifurcation curves are described. A classification of singularities of the system solutions is also obtained.

Key words: integrable Hamiltonian systems, geodesic flow, surfaces of revolution, Fomenko–Zieschang invariant, torus.

UDC: 514.7, 514.8

Received: 09.11.2016

 English version: Moscow University Mathematics Bulletin, Moscow University Mеchanics Bulletin, 2017, 72:3, 121–128

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