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ЖУРНАЛЫ // Russian Journal of Nonlinear Dynamics // Архив

Rus. J. Nonlin. Dyn., 2019, том 15, номер 2, страницы 187–198 (Mi nd652)

Эта публикация цитируется в 3 статьях

Mathematical problems of nonlinearity

Global Dynamics of Systems Close to Hamiltonian Ones Under Nonconservative Quasi-periodic Perturbation

A. D. Morozov, K. E. Morozov

Lobachevsky State University of Nizhni Novgorod, prosp. Gagarina 23, Nizhni Novgorod 603950, Russia

Аннотация: We study quasi-periodic nonconservative perturbations of two-dimensional Hamiltonian systems. We suppose that there exists a region $D$ filled with closed phase curves of the unperturbed system and consider the problem of global dynamics in $D$. The investigation includes examining the behavior of solutions both in $D$ (the existence of invariant tori, the finiteness of the set of splittable energy levels) and in a neighborhood of the unperturbed separatrix (splitting of the separatrix manifolds). The conditions for the existence of homoclinic solutions are stated. We illustrate the research with the Duffing – Van der Pole equation as an example.

Ключевые слова: resonances, quasi-periodic, periodic, averaged system, phase curves, equilibrium states, limit cycles, separatrix manifolds.

MSC: 34C15, 34C27, 34C37

Поступила в редакцию: 14.04.2019
Принята в печать: 20.06.2019

DOI: 10.20537/nd190208



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