(2+1)-dimensional bi-Hamiltonian system obtained from symmetry reduction of (3+1)-dimensional Hirota type equation

TURKISH PHYSICAL SOCIETY 35TH INTERNATIONAL PHYSICS CONGRESS (TPS35) Pub Date : 2019-11-25 DOI:10.1063/1.5135447

D. Yazici

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Abstract

In this work, we show that the integrable (3+1)-dimensional Hirota type nonlinear differential equation reduces to the (2+1)-dimensional Hirota type equation by symmetry reduction. It is proved that starting from the Dirac constraint analysis and degenerate Lagrangian, obtained (2+1)-dimensional equation is also integrable and admit bi-Hamiltonian structure. Moreover, all the parameters defined in four dimensional system like Lagrangian, Hamiltonian operators, Hamiltonian functions and recursion operator have the same result of the three dimensional system after the reduction.In this work, we show that the integrable (3+1)-dimensional Hirota type nonlinear differential equation reduces to the (2+1)-dimensional Hirota type equation by symmetry reduction. It is proved that starting from the Dirac constraint analysis and degenerate Lagrangian, obtained (2+1)-dimensional equation is also integrable and admit bi-Hamiltonian structure. Moreover, all the parameters defined in four dimensional system like Lagrangian, Hamiltonian operators, Hamiltonian functions and recursion operator have the same result of the three dimensional system after the reduction.

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由(3+1)维Hirota型方程的对称约简得到(2+1)维双哈密顿系统

本文通过对称约简，证明了可积(3+1)维Hirota型非线性微分方程可约化为(2+1)维Hirota型方程。从Dirac约束分析和简并拉格朗日出发，证明了(2+1)维方程也是可积的，并承认双哈密顿结构。而且，在四维系统中定义的拉格朗日算子、哈密顿算子、哈密顿函数、递归算子等参数，经过约化后都具有与三维系统相同的结果。本文通过对称约简，证明了可积(3+1)维Hirota型非线性微分方程可约化为(2+1)维Hirota型方程。从Dirac约束分析和简并拉格朗日出发，证明了(2+1)维方程也是可积的，并承认双哈密顿结构。而且，在四维系统中定义的拉格朗日算子、哈密顿算子、哈密顿函数、递归算子等参数，经过约化后都具有与三维系统相同的结果。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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TURKISH PHYSICAL SOCIETY 35TH INTERNATIONAL PHYSICS CONGRESS (TPS35)

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