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This article is cited in 9 scientific papers (total in 9 papers)
Homogeneous systems with quadratic integrals, Lie-Poisson quasibrackets, and Kovalevskaya's method
I. A. Bizyaev, V. V. Kozlov Steklov Mathematical Institute of Russian Academy of Sciences, Moscow
Abstract:
We consider differential equations with quadratic right-hand sides that admit two quadratic first integrals, one of which is a positive-definite quadratic form. We indicate conditions of general nature under which a linear change of variables reduces this system to a certain ‘canonical’ form. Under these conditions, the system turns out to be divergenceless and can be reduced to a Hamiltonian form, but the corresponding linear Lie-Poisson bracket does not always satisfy the Jacobi identity. In the three-dimensional case, the equations can be reduced to the classical equations of the Euler top, and in four-dimensional space, the system turns out to be superintegrable and coincides with the Euler-Poincaré equations on some Lie algebra. In the five-dimensional case we find a reducing multiplier after multiplying by which the Poisson bracket satisfies the Jacobi identity. In the general case for $n>5$ we prove the absence of a reducing multiplier. As an example we consider a system of Lotka-Volterra type with quadratic right-hand sides that was studied by Kovalevskaya from the viewpoint of conditions of uniqueness of its solutions as functions of complex time.
Bibliography: 38 titles.
Keywords:
first integrals, conformally Hamiltonian system, Poisson bracket, Kovalevskaya system, dynamical systems with quadratic right-hand sides.
Received: 30.06.2015
Citation:
I. A. Bizyaev, V. V. Kozlov, “Homogeneous systems with quadratic integrals, Lie-Poisson quasibrackets, and Kovalevskaya's method”, Sb. Math., 206:12 (2015), 1682–1706
Linking options:
https://www.mathnet.ru/eng/sm8564https://doi.org/10.1070/SM2015v206n12ABEH004509 https://www.mathnet.ru/eng/sm/v206/i12/p29
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Abstract page: | 721 | Russian version PDF: | 235 | English version PDF: | 38 | References: | 76 | First page: | 36 |
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