Breather and its interaction with rogue wave of the coupled modified nonlinear Schrodinger equation

We investigate the coupled modified nonlinear Schr?dinger equation.Breather solutions are constructed through the traditional Darboux transformation with nonzero plane-wave solutions.To obtain the higher-order localized wave solution,the N-fold generalized Darboux transformation is given.Under the condition that the characteristic equation admits a double-root,we present the expression of the first-order interactional solution.Then we graphically analyze the dynamics of the breather and rogue wave.Due to the simultaneous existence of nonlinear and self-steepening terms in the equation,different profiles in two components for the breathers are presented.

New Exact Solutions for the Coupled Nonlinear Schrödinger Equations with Variable Coefficients

In this paper, coupled nonlinear Schrödinger equations with variable coefficients are studied, which can be used to describe the interaction among the modes in nonlinear optics and Bose-Einstein condensation. Some novel bright-dark solitons and dark-dark solitons are obtained by modified Sine-Gordon equation method. Moreover, some figures are provided to illustrate how the soliton solutions propagation is determined by the different values of the variable group velocity dispersion terms, which can be used to model various phenomena.

EXACT SOLUTIONS OF(2+1)-DIMENSIONAL NONLINEAR SCHRoDINGER EQUATION BASED ON MODIFIED EXTENDED TANH METHOD

In this paper, the modified extended tanh method is used to construct more general exact solutions of a （2＋1）-dimensional nonlinear SchrSdinger equation. With the aid of Maple and Matlab software, we obtain exact explicit kink wave solutions, peakon wave solutions, periodic wave solutions and their 3D images.

New Exact Traveling Wave Solutions of the Unstable Nonlinear Schrdinger Equations

The present paper studies the unstable nonlinear Schr¨odinger equations, describing the time evolution of disturbances in marginally stable or unstable media. More precisely, the unstable nonlinear Schr¨odinger equation and its modified form are analytically solved using two efficient distinct techniques, known as the modified Kudraysov method and the sine-Gordon expansion approach. As a result, a wide range of new exact traveling wave solutions for the unstable nonlinear Schr¨odinger equation and its modified form are formally obtained.

非线性Schrdinger方程的Compacton解和孤立波解

研究了非线性Schro..dinger方程:iut+αuxx+β|u|2pu=0(p为任意实数),得到丰富的孤立波解:当p>0时得到孤立波解,p<0时得到移动Compacton解,p=0时得到Compacton解;研究了(2+1)维非线性Schro..dinger方程的解,并推广到(n+1)维非线性Schro..dinger方程 还比较了任意维非线性Schro..

非稳的非线性Schrdinger方程的显式精确解

借助于一个规范变换和组合的假设方法,求出了非稳的非线性Schr dinger方程的一些显式精确行波解,包括精确的平面波解、钟状孤立波解、扭状孤立波解、钟状扭状组合的孤立波解、奇异行波解和三角函数周期波解,补充和完善了已有文献的结果.

具耗散的非线性Schrdinger方程行波解的不稳定性分析

研究了具耗散的非线性Schr dinger方程的行波解的存在性与不稳定色散关系 .讨论了行波解的性质 ,用数学分析方法得到了行波解的振荡性、稳定性及不稳定的色散关系表达式 ,得到了参数C1,C2 ,振幅 |U0 |及波数q间的关系 .

一类非线性Schrdinger方程在奇维空间中的H^s(Ω)光滑整体解

研究一类非线性Schrdinger方程的混合问题在任意奇维空间中的Hs(Ω)光滑整体解的存在性和渐近性,这是在高维空间中对这一问题现有结果的完善和推广.

修正的非稳非线性Schrdinger方程的显式精确解

首先利用一个标准变换将修正的非稳非线性 Schro¨ dinger方程化成一个非线性偏微分方程组 ,接着通过选取不同参数得到一些非线性代数方程和非线性常微分方程。然后通过直接方法和假设方法的结合求得约化得到的非线性常微分方程的精确解 ,从而得到修正的非稳非线性 Schro¨ dinger方程的显式精确解 ,包括精确平面波解、钟状孤立波解、扭状孤立波解。

一类不稳定的非线性Schrdinger方程的有限差分方法

研究了一类不稳定的非线性Ｓｃｈｒｏ¨ｄｉｎｇｅｒ方程ｉｕｘ＋ｕｔｔ＋εｕｘｔ＋ｆ（｜ｕ｜２）ｕ＝０（ε１，ｘ∈［０，１］，０≤ｔ≤Ｔ）的初边值问题，构造了该问题的一类无条件稳定的差分格式，利用非线性函数的有界延拓法与能量估计法得到了差分格式的误差估计，证明了差分格式的收敛性与稳定性．

一类非定常的非线性Schrdinger方程的Fourier谱方法

研究了一类非定常的非线性Ｓｃｈｒｏ¨ｄｉｎｇｅｒ方程ｉｕｘ＋ｕｔｔ＋εｕｘｔ＋ｆ（｜ｕ｜２）ｕ＝０（ε１，ｘ∈Ｒ，０≤ｔ≤Ｔ）的周期初值问题．分别构造了该问题的一类无条件稳定的半离散的谱格式、全离散的谱格式和拟谱格式，利用非线性函数的有界延拓法与能量估计法得到了格式的误差估计。

带自陡峭项修正的非线性Schrdinger方程的数值模拟

运用Taylor展开方法对带自陡峭项修正的非线性Schrdinger方程的初边值问题进行数值模拟,给出了Crank-Nicolson数值格式。该格式很好地模拟了带自陡峭项修正的非线性Schrdinger方程的怪波解,并验证了该格式具有保持时空二阶精度的性质及其精确性。

分数阶非线性Schrdinger方程周期边值问题的整体光滑解

利用Faedo-Galёrkin方法及能量估计研究了分数阶非线性Schrdinger方程在满足周期边值条件下整体光滑解的存在性和唯一性.

一类非线性Schr?dinger方程驻波解的存在性

证明了等离子体中出现的一类非线性Schr?dinger方程驻波解的存在性。

导数非线性Schr dinger方程的爆破解

研究下述导数非线性Schrodinger方程的初边值问题:iφ_(t)+αφ_(xx)=iβ|φ|^(2σ)φx-g(|φ|^(2))φ,σ1,x∈[a,b],其中α,β为实数,g(·)是实值函数.当α,β,φ0及g(s)满足一定条件时,利用守恒律和修正的virial等式,证明了爆破解的存在性.最后,得到了爆破解的渐近行为等一些性质.

All-optical switches based on three-soliton inelastic interaction and its application in optical communication systems

In high-speed optical communication systems,in order to improve the communication rate,the distance between pulses must be compressed,which will cause the problem of the interaction between optical pulses in optical communication systems,which has been widely concerned by researches.In this paper,the bilinear method will be used to analyze the coupled high-order nonlinear Schro¨dinger equations and obtain their three-soliton solutions.Then,the influence of the relevant parameters in the three-soliton solution on the soliton inelastic interaction is studied.In addition,the constraint conditions of each parameter in the three-soliton solution are analyzed,the inelastic interaction properties of optical solitons under different parameter conditions are obtained,and the relevant laws of the inelastic interaction of solitons are studied.The results will have potential applications in the soliton control,all-optical switching and optical computing.

快速数值差分递推改进算法在超宽连续谱模拟中的应用研究

对快速数值差分递推公式进行了改进,使之能够求解带有脉冲自陡峭项和脉冲内喇曼散射项的非线性薛定谔方程.通过与传统孤子解析结果及分步傅里叶方法数值结果的对比分析表明,快速数值差分递推改进算法是一种快速而准确的数值计算方法,它不仅能够同步考虑光学媒质中的群速色散作用和非线性克尔作用,而且将所有高阶非线性项对光脉冲传输的影响也考虑了进去.运用该算法模拟了由于光纤非线性效应和群速色散效应共同作用所产生的超宽连续谱现象,为光学媒质中一系列非线性现象的模拟提供了新的研究思路.

耦合广义非线性薛定谔方程的相互作用表象龙格库塔算法及其误差分析

本文通过表象变换,将耦合广义非线性薛定谔方程(C-GNLSE)变换成相互作用表象中的向量方程,再利用向量形式的4阶龙格-库塔迭代格式,建立了一种在频域内求解C-GNLSE的同步更新迭代算法.通过将该向量形式的相互作用表象中的4阶龙格-库塔(V-JH-RK4IP)算法应用于高双折射光子晶体光纤中超连续谱产生的数值模拟,验证了算法的有效性,通过与现有其他典型算法的比较,表明以V-JH-RK4IP算法求解C-GNLSE具有最高的计算精度和计算效率.