Action-angle variables for the Lie–Poisson Hamiltonian systems associated with the Hirota–Satsuma modified Boussinesq equation

Xue Geng; Dianlou Du; Xianguo Geng

doi:10.3389/fphy.2023.1285301

Frontiers in Physics (Dec 2023)

Action-angle variables for the Lie–Poisson Hamiltonian systems associated with the Hirota–Satsuma modified Boussinesq equation

Xue Geng,
Dianlou Du,
Xianguo Geng

Affiliations

Xue Geng: School of Mathematics and Statistics, Anyang Normal University, Anyang, China
Dianlou Du: School of Mathematics and Statistics, Zhengzhou University, Zhengzhou, China
Xianguo Geng: School of Mathematics and Statistics, Zhengzhou University, Zhengzhou, China

DOI: https://doi.org/10.3389/fphy.2023.1285301
Journal volume & issue: Vol. 11

Abstract

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In this work, we present two finite-dimensional Lie–Poisson Hamiltonian systems associated with the Hirota–Satsuma modified Boussinesq equation by using the nonlinearization method. Moreover, the separation of variables on the common level set of Casimir functions is introduced to study these systems which are associated with a non-hyperelliptic algebraic curve. Finally, in light of the Hamilton–Jacobi theory, the action-angle variables for these systems are constructed, and the Jacobi inversion problem associated with the Hirota–Satsuma modified Boussinesq equation is obtained.

Published in Frontiers in Physics

ISSN: 2296-424X (Online)
Publisher: Frontiers Media S.A.
Country of publisher: Switzerland
LCC subjects: Science: Physics
Website: https://www.frontiersin.org/journals/physics

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