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Mathematics and Mechanics

Russian Academy of Sciences
 Founded
in January 1936
(Translated from 1958)
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IssuesArchive of Issues2012-4pp.378-387

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V.V. Kozlov, "Invariant manifolds of Hamilton's equations," J. Appl. Math. Mech. 76 (4), 378-387 (2012)
Year 2012 Volume 76 Issue 4 Pages 378-387
Title Invariant manifolds of Hamilton's equations
Author(s) V.V. Kozlov (Moscow, Russia, kozlov@pran.ru)
Abstract The invariance conditions of smooth manifolds of Hamilton's equations are represented in the form of multidimensional Lamb's equations from the dynamics of an ideal fluid. In the stationary case these conditions do not depend on the method used to parameterize the invariant manifold. One consequence of Lamb's equations is an equation of a vortex, which is invariant to replacements of the time-dependent variables. A proof of the periodicity conditions of solutions of autonomous Hamilton's equations with n degrees of freedom and compact energy manifolds that admit of 2n−3 additional first integrals is given as an application of the theory developed.
Received 07 December 2011
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