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Электронный каталог: Lapshenkova, L. O. - On a Finite-Difference Scheme Defining a Birationalnon-Quadratic Map between Time Layers
Lapshenkova, L. O. - On a Finite-Difference Scheme Defining a Birationalnon-Quadratic Map between Time Layers

Статья
Автор: Lapshenkova, L. O.
Discrete and Continuous Models and Applied Computational Science: On a Finite-Difference Scheme Defining a Birationalnon-Quadratic Map between Time Layers
б.г.
ISBN отсутствует
Автор: Lapshenkova, L. O.
Discrete and Continuous Models and Applied Computational Science: On a Finite-Difference Scheme Defining a Birationalnon-Quadratic Map between Time Layers
б.г.
ISBN отсутствует
Статья
Lapshenkova, L.O.
On a Finite-Difference Scheme Defining a Birationalnon-Quadratic Map between Time Layers / L.O.Lapshenkova, K.S.Mashkovtseva, A.A.Trusova, M.D.Malykh. – Text : electronic // Discrete and Continuous Models and Applied Computational Science. – 2026. – Vol. 34, No. 1. – P. 98–112. – URL: https://doi.org/10.22363/2658-4670-2026-34-1-98-112. – Bibliogr.: 21.
The article considers reversible difference schemes for dynamical systems based on the system doublingmethod proposed by V.N. Abrashin and S.N. Sytova. The method duplicates the original variables, leading toan extended system whose finite-difference approximation defines a birational map between time layers. Thepreservation of algebraic integrals in such schemes is investigated. It is proved that if the original system admitsa homogeneous quadratic first integral, the corresponding bilinear form is exactly preserved by the discretescheme. This property is demonstrated on the Jacobi oscillator, where the geometric mean of the duplicatedvariables ensures exact conservation of the quadratic integral. A more detailed analysis is performed on thenon-trivial Vanhaecke system, an integrable Hamiltonian system with two degrees of freedom and higher-degreepolynomial integrals. Numerical experiments carried out in the computer algebra system Sage using the packagefdm.sage confirm that the two copies oscillate synchronously around the exact values of the first integrals,and averaging reduces the oscillation amplitude. For separable Hamiltonian systems, the scheme is shown tobe symplectic. The results obtained allow recommending the doubling method for constructing stable andstructure-preserving numerical integrators for a wide class of dynamical systems with polynomial right-handsides, including high-dimensional systems.
Спец.(статьи,препринты) = С 17 д - Численное решение дифференциальных и интегральных уравнений. Разностные методы
ОИЯИ = ОИЯИ (JINR)2026
Lapshenkova, L.O.
On a Finite-Difference Scheme Defining a Birationalnon-Quadratic Map between Time Layers / L.O.Lapshenkova, K.S.Mashkovtseva, A.A.Trusova, M.D.Malykh. – Text : electronic // Discrete and Continuous Models and Applied Computational Science. – 2026. – Vol. 34, No. 1. – P. 98–112. – URL: https://doi.org/10.22363/2658-4670-2026-34-1-98-112. – Bibliogr.: 21.
The article considers reversible difference schemes for dynamical systems based on the system doublingmethod proposed by V.N. Abrashin and S.N. Sytova. The method duplicates the original variables, leading toan extended system whose finite-difference approximation defines a birational map between time layers. Thepreservation of algebraic integrals in such schemes is investigated. It is proved that if the original system admitsa homogeneous quadratic first integral, the corresponding bilinear form is exactly preserved by the discretescheme. This property is demonstrated on the Jacobi oscillator, where the geometric mean of the duplicatedvariables ensures exact conservation of the quadratic integral. A more detailed analysis is performed on thenon-trivial Vanhaecke system, an integrable Hamiltonian system with two degrees of freedom and higher-degreepolynomial integrals. Numerical experiments carried out in the computer algebra system Sage using the packagefdm.sage confirm that the two copies oscillate synchronously around the exact values of the first integrals,and averaging reduces the oscillation amplitude. For separable Hamiltonian systems, the scheme is shown tobe symplectic. The results obtained allow recommending the doubling method for constructing stable andstructure-preserving numerical integrators for a wide class of dynamical systems with polynomial right-handsides, including high-dimensional systems.
Спец.(статьи,препринты) = С 17 д - Численное решение дифференциальных и интегральных уравнений. Разностные методы
ОИЯИ = ОИЯИ (JINR)2026
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