共查询到19条相似文献,搜索用时 171 毫秒
1.
借助于Painlev Bcklund变换和多线性变量分离方法, 求得了(2+1)维非线性Boiti Leon Pempinelle系统的一般变量分离解.根据得到的一般解, 可以构建出丰富的局域相干结构, 如峰状孤子、紧致子等. 得到了两种新的局域结构——钟状圈孤子和峰状圈孤子, 并简要讨论了这两种圈孤子的一些特殊演化性质.
关键词:
Boiti Leon Pempinelle系统
多线性变量分离法
钟状圈孤子
峰状圈孤子 相似文献
2.
利用分离变量法,研究了(2+1)维非线性薛定谔(NLS)方程的局域结构.由于在B?cklund变换和变量分离步骤中引入了作为种子解的任意函数,得到了NLS方程丰富的局域结构.合适地选择任意函数,局域解可以是dromion,环孤子,呼吸子和瞬子.dromion解不仅可以存在于直线孤子的交叉点上,也可以存在于曲线孤子的最近邻点上.呼吸子在幅度和形状上都进行了呼吸
关键词:
非线性薛定谔方程
分离变量法
孤子结构 相似文献
3.
用分离变量法研究了新(2+1)维非线性演化方程的相干孤子结构.由于Bcklund变换和变量分离步骤中引入了作为种子解的任意函数,得到了新(2+1)维非线性演化方程丰富的孤子解.合适地选择任意函数,孤子解可以是solitoffs,dromions,dromion格子,呼吸子和瞬子.呼吸子不仅在幅度、形状,各峰间距离,甚至在峰的数目上都进行了呼吸.
关键词:
新(2+1)维非线性演化方程
分离变量法
孤子结构 相似文献
4.
研究(1+1)维广义的浅水波方程的变量分离解和孤子激发模式. 该方程包括两种完全可积(IST可积)的特殊情况,分别为AKNS方程和Hirota-Satsuma方程. 首先把基于Bcklund变换的变量分离(BT-VS)方法推广到该方程,得到了含有低维任意函数的变量分离解. 对于可积的情况,含有一个空间任意函数和一个时间任意函数,而对于不可积的情况,仅含有一个时间任意函数,其空间函数需要满足附加条件. 另外,对于得到的(1+1)维普适公式,选取合适的函数,构造了丰富的孤子激发模式,包括单孤子,正-反孤子,孤子膨胀,类呼吸子,类瞬子等等. 最后,对BT-VS方法作一些讨论.
关键词:
浅水波方程
Bcklund变换
变量分离
孤子 相似文献
5.
6.
利用分离变量法得到了2+1维Nizhnik-Novikov-Veselov方程包含三个任意函数的精确解.合 适地选择任意函数,该精确解可以是描述所有方向指数局域的dromion相互作用,三个方向 指数局域的‘Solitoff’和dromion相互作用以及线孤子和y周期孤子相互作用的解.对dromi on相互作用从解析和几何两个角度进行了详细地探讨,揭示了一些新的相互作用规律.
关键词:
dromions相互作用
NNV方程
分离变量法 相似文献
7.
8.
利用推广的齐次平衡方法,研究了(2+1)维BroerKaup方程的局域相干结构.首先根据领头项分析,给出了这个模型的一个变换,并把它变换成一个线性化的方程,然后由具有两个任意函数的种子解构造出它的一个精确解,发现(2+1)维BroerKaup方程存在相当丰富的局域相干结构.合适的选择这些任意函数,一些特殊型的多dromion解,多lump解,振荡型dromion解,圆锥曲线孤子解,运动和静止呼吸子解和似瞬子解被得到.孤子解不仅可以存在于直线孤子的交叉点上,也可以存在于曲线孤子的交叉点或最临近点上.呼吸子在幅度和形状上都进行了呼吸.本方法直接而简单,可推广应用一大类(2+1)维非线性物理模型.
关键词:
浙江师范大学非线性物理研究室
金华321004 浙江海洋学院物理系
舟山316004 相似文献
9.
10.
将扩展的Riccati方程映射法推广到了(3+1)维非线性Burgers系统,得到了系统的分离变量解;由于在解中含有一个关于自变量(x,y,z,t)的任意函数,通过对这个任意函数的适当选取,并借助于数学软件Mathematica进行数值模拟,得到了系统的新而丰富的局域激发结构和分形结构.结果表明,扩展的Riccati方程映射法在求解高维非线性系统时,仍然是一种行之有效的方法,并且可以得到比(2+1)维非线性系统更为丰富的局域激发结构.
关键词:
扩展的Riccati方程映射法
(3+1)维非线性Burgers方程
局域激发结构
分形结构 相似文献
11.
Starting from a special Bäcklund transform and a variable separation approach, a quite general variable separation solution of the
generalized (2+1)-dimensional perturbed nonlinear Schrödinger
system is obtained. In addition to the single-valued localized coherent soliton excitations like dromions, breathers, instantons, peakons, and previously revealed chaotic localized
solution, a new type of multi-valued (folded) localized excitation is derived
by introducing some appropriate lower-dimensional multiple valued
functions. 相似文献
12.
Two classes of fractal structures for the (2+1)-dimensional dispersive long wave equation 总被引:1,自引:0,他引:1 
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下载免费PDF全文 Using the mapping approach via a Riccati equation, a series of variable separation
excitations with three arbitrary functions for the (2+1)-dimensional dispersive long wave (DLW)
equation are derived. In addition to the usual localized coherent soliton excitations like
dromions, rings, peakons and compactions, etc, some new types of excitations
that possess fractal behaviour are obtained by introducing appropriate
lower-dimensional localized patterns and Jacobian elliptic functions. 相似文献
13.
Starting from a special Backlund transform and a variable separation approach, a quite general variableseparation solution of the generalized (2+ 1)-dimensional perturbed nonlinear Schrodinger system is obtained. In additionto the single-valued localized coherent soliton excitations like dromions, breathers, instantons, peakons, and previouslyrevealed chaotic localized solution, a new type of multi-valued (folded) localized excitation is derived by introducingsome appropriate lower-dimensional multiple valued functions. 相似文献
14.
ZHENG Chun-Long 《理论物理通讯》2005,43(6):1061-1067
Using an extended projective method, a new type of variable
separation solution with two arbitrary functions of the
(2+1)-dimensional generalized Broer-Kaup system (GBK) is derived.
Based on the derived variable separation solution, some special
localized coherent soliton excitations with or without elastic
behaviors such as dromions, peakons, and foldons etc. are
revealed by selecting appropriate functions in this paper. 相似文献
15.
ZHENGChun-Long 《理论物理通讯》2003,40(1):25-32
In this work, we reveal a novel phenomenon that the localized coherent structures of some (2 1)-dimensional physical models possess chaotic and fractal behaviors. To clarify these interesting phenomena, we take the (2 l)-dimensional modified dispersive water-wave system as a concrete example. Starting from a variable separation approach,a general variable separation solution of this system is derived. Besides the stable located coherent soliton excitations like dromions, lumps, rings, peakons, and oscillating soliton excitations, some new excitations with chaotic and fractal behaviors are derived by introducing some types of lower dimensional chaotic and fractal patterns. 相似文献
16.
With the aid of an improved projective approach and a linear variable separation method,new types of variable separation solutions (including solitary wave solutions,periodic wave solutions,and rational function solutions)with arbitrary functions for (2 1)-dimensional Korteweg-de Vries system are derived.Usually,in terms of solitary wave solutions and rational function solutions,one can find some important localized excitations.However,based on the derived periodic wave solution in this paper,we find that some novel and significant localized coherent excitations such as dromions,peakons,stochastic fractal patterns,regular fractal patterns,chaotic line soliton patterns as well as chaotic patterns exist in the KdV system as considering appropriate boundary conditions and/or initial qualifications. 相似文献
17.
By means of variable separation approach, quite a general excitation of the new (2 + 1)-dimensional long dispersive wave system: λqt + qxx - 2q ∫ (qr)xdy = 0, λrt - rxx + 2r ∫(qr)xdy = 0, is derived. Some types of the usual localized excitations such as dromions, lumps, rings, and oscillating soliton excitations can be easily constructed by selecting the arbitrary functions appropriately. Besides these usual localized structures, some new localized excitations like fractal-dromion, farctal-lump, and multi-peakon excitations of this new system are found by selecting appropriate functions. 相似文献
18.
Starting from the standard truncated Painlevé
expansion and a multilinear variable separation approach, a quite general
variable separation solution of the (2+1)-dimensional (M+N)-component AKNS
(Ablowitz–Kaup–Newell–Segur) system is derived. In addition to the
single-valued localized coherent soliton excitations like dromions,
breathers, instantons, peakons, and a previously revealed chaotic localized
solution, a new type of multi-valued (folded) localized excitation is
obtained by introducing some appropriate lower-dimensional multiple valued
functions. The folded phenomenon is quite universal in the real natural
world and possesses quite rich structures and abundant interaction
properties. 相似文献
19.
With the help of an extended mapping approach and a linear variable separation method, new families of variable separation solutions with arbitrary functions for the (3+1)-dimensional Burgers system are derived. Based on the derived exact solutions,
some novel and interesting localized coherent excitations such as
embed-solitons are revealed by selecting appropriate boundary
conditions and/or initial qualifications. The time evolutional properties of the novel localized excitation are also briefly investigated. 相似文献