Asymptotic integrability and Hamilton theory of soliton's motion along large-scale background waves

A. M. Kamchatnov
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Abstract

We consider the problem of soliton-mean field interaction for the class of asymptotically integrable equations, where the notion of the complete integrability means that the Hamilton equations for the high-frequency wave packet propagation along a large-scale background wave have an integral of motion. Using the Stokes remark, we transform this integral to the integral for the soliton's equations of motion and then derive the Hamilton equations for the soliton's dynamics in a universal form expressed in terms of the Riemann invariants for the hydrodynamic background wave. The physical properties are specified by the concrete expressions for the Riemann invariants. The theory is illustrated by its application to the soliton's dynamics which is described by the Kaup-Boussinesq system.
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孤子沿大尺度背景波运动的渐近可积分性和汉密尔顿理论
我们考虑了渐近可积分方程类的孤子-均场相互作用问题,其中完全可积分概念意味着高频波包沿大尺度背景波传播的汉密尔顿方程有一个运动积分。利用斯托克斯注释,我们将该积分转换为孤子运动方程的积分,然后推导出孤子动力学的汉密尔顿方程,该方程以流体动力背景波的黎曼变量的通用形式表示。黎曼不变式的具体表达式指明了其物理特性。该理论通过应用于考普-布西尼斯克系统描述的孤子动力学得到了展示。
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