一个经典的可积Neumann系统和Boussinesq族Lax对的非线性化 A Classical Integrable Neumann System and the Nonlinearization of the Lax Pair for Classical Boussinesq Hierarchy期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

一个经典的可积Neumann系统和Boussinesq族Lax对的非线性化

引用本文：	许太喜查中伟. 一个经典的可积Neumann系统和Boussinesq族Lax对的非线性化[J]. 应用数学, 1994, 7(3): 264-268

作者姓名：	许太喜查中伟

作者单位：	石家庄铁道学院 050043(许太喜，牟卫华)，葛洲坝水电工程学院 443002(查中伟)

摘要：	本文在位势与特征函数之间的Neumann约束条件下,经典Boussinesq族的Lax对被非线性化成为自然相容的Lax系统;而且,其为Liouville完全可积的Hamiltonian系统,同时获得了Boussinesq方程解的对合表示。
关键词：	约束条件对合系统 Liouville完全可积
A Classical Integrable Neumann System and the Nonlinearization of the Lax Pair for Classical Boussinesq Hierarchy

Xu Taixi Mu Weihua. A Classical Integrable Neumann System and the Nonlinearization of the Lax Pair for Classical Boussinesq Hierarchy[J]. Mathematica Applicata, 1994, 7(3): 264-268

Authors:	Xu Taixi Mu Weihua

Affiliation:	Xu Taixi Mu Weihua(Shi jiazhuang Institute of Railway 050043)Zha Zhongwei(Gezhouba Institute of Hyaroelectric Engineering 443002)

Abstract:	Under the C. Neumann constraint condition between the potentials and the eigenfunctions,the Lax pair for classical Boussinesq hierarchy is nonlinearized to be a naturally consistent Lax system. Furthermore,which are completely integrable Hamiltonian systems in Liouville sense. The in-volutive representation of solutions of classical Boussinesq equation is obtained.

Keywords:	Constraint condition Involutive system Completely integrable in Liou-ville sense
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