李倩,夏铁成

(1.上海大学理学院,上海 200444;

2.郑州航空工业管理学院理学院,郑州 450005)

Dirac孤子族的三可积耦合及其双Hamiltonian结构

李倩1,2,夏铁成1

(1.上海大学理学院,上海 200444;

2.郑州航空工业管理学院理学院,郑州 450005)

基于扩大的零曲率方程和矩阵李代数的半直和,得到了Dirac孤子族的三可积耦合,并借助变分恒等式得到了三可积耦合的双Hamiltonian结构.

Dirac孤子族;三可积耦合;双Hamiltonian结构

众所周知,可积耦合是孤子理论中有趣而重要的课题[1-3].研究可积耦合不仅可以概括对称问题,而且为可积系统的完全分类提供了线索,甚至可以显现出可积方程所拥有的数学结构.自从可积耦合的定义[4]被提出后,方程族可积耦合得到广泛关注,并出现了很多建立方程组可积耦合的方法,如扩大谱问题、李代数的半直和、新的李代数等[5-20].关于可积耦合的研究甚至推广到了超可积系统[18-20].2012年,Ma[21]用块型矩阵李代数建立了方程族的双可积耦合,之后又进一步将双可积耦合推广到三可积耦合[22].

对于给定的可积系统

式中,u为独立变量构成的列向量.可积系统(1)的三可积耦合指的是扩大的三角形可积系统:

如果S1(u,u1),S2(u,u1,u2)和S3(u,u1,u2,u3)中至少有一个关于任何新的独立变量u1,u2,u3是非线性的,则称这个系统是非线性可积耦合的.

为了建立三可积耦合,需要一系列三角形4×4的分块矩阵M(A1,A2,A3,A4),其中Ai(1≤i≤4)是同阶的方阵.引入一系列具有半直和分解的矩阵李代数：

其中Ai(λ)(i=1,2,3,4)为λ的罗朗级数,则其必为非半单的.显然,gc是的一个非平凡理想.

上述所提出的李代数为产生非线性三可积耦合提供了一组基,因为交换算子[A2,B2] 和[A3,B3]在对应的三可积耦合中能够产生非线性项,而其余现有的李代数产生线性可积耦合,其中子块A1对应原始的可积系统,子块A2,A3和A4用来生成辅助向量域S1,S2和S3.

本工作的主要目的是基于文献[23]中的方法建立Dirac族的三可积耦合.选取其中一个分块矩阵:

式中,α,β和µ是3个任意给定的常数.进一步地,希望获得对应三可积耦合的双Hamiltonian结构.

1 Dirac族

2 Dirac族的三可积耦合

基于特殊的非半单李代数,选取如下扩大的谱矩阵:

其中si,vi是新的独立变量.为了求解扩大的零曲率方程

当m≥2时,由式(31)可以得出Dirac方程族的非线性三可积耦合.

3 Hamiltonian结构

应用变分恒等式(23)建立对应三可积耦合的Hamiltonian结构:

要求FT=F.在对称条件下,不变性质〈a,[b,c]〉=〈[a,b],c〉等价于要求F(R(b))T=−R(b)F, b∈R12.具有任意常数b的矩阵方程产生矩阵F的线性系统,求解对应的系统可以得到

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Tri-integrable couplings of Dirac hierarchy and its bi-Hamiltonian structure

LI Qian1,2,XIA Tiecheng1
(1.College of Sciences,Shanghai University,Shanghai 200444,China; 2.College of Sciences,Zhengzhou University of Aeronautics,Zhengzhou 450005,China)

Tri-integrable couplings of Dirac hierarchy are obtained based on the enlarged zero curvature equation from semi-direct sums of Lie algebras.Its bi-Hamiltonian structures are then established with variational identity.

Dirac hierarchy;tri-integrable couplings;bi-Hamiltonian structure

O 175.2

A

1007-2861(2017)02-0257-10

10.3969/j.issn.1007-2861.2015.04.022

2015-10-26

国家自然科学基金资助项目(11271008,61640315);河南省高等学校重点科研资助项目(17A120006)

夏铁成(1960—),男,教授,博士生导师,研究方向为孤子与可积系统.E-mail:xiatc@shu.edu.cn