Extended tanh-function Metho d for Solving Traveling Wave Solutions of Nonlinear Kundu Equation

In this paper, by using the balancing method and the extended tanh-function method, we obtain the exact traveling wave solutions of Kundu equation with fifth-order nonlinear term. Applications of this method to some other nonlinear partial differential equations are also presented.     

Approximate general and explicit solutions of nonlinear BBMB equations by Exp-Function method

In this work, we implement a relatively new analytical technique, the Exp-Function method, for solving special form of generalized nonlinear Benjamin–Bona–Mahony–Burgers equation (BBMB) which may contain high nonlinear terms.     

一个非线性方程的渐近激波解

该文是利用简捷的方法得到了高精度的非线性问题渐近激波解。     

非线性Schr(o)dinger方程的整体吸引子

本文讨论了一类带调和势|x|2的非线性Schr(o)dinger方程解的长时间行为,证明了整体吸引子的存在性.     

具有奇性方程的非线性奇摄动问题的正解(英文)

本文讨论了一类具有奇性方程的奇摄动初值问题.在适当条件下,利用微分不等式理论,研究了初值问题解的存在性及其渐近性态,并且得到了具有初始层的一致有效解的渐近展开式.     

一类非线性方程的激波解

利用匹配渐近展开法讨论了非线性方程的激波解及其位置，并得出了它们与边界条件的关系     

二次非线性算子方程精确解的表示

该文在再生核空间中讨论了一类非线性算子方程Av+Bv+Cv=f的求解问题，并且给出了精确解的表达式.      

一类广义非线性Euler-Poisson-Darboux方程整体解的渐近性质

W.A.Strauss等人已证明了广义非线性 Euler-Poisson-Darboux方程初边值问题整体解的存在唯一性 .本文应用一个差分不等式研究了整体解的渐近性质 .     

一类非线性弹性杆波动方程的求解

对计入横向惯性效应后的非线性弹性杆纵向波动方程进行了分析,得到了一类非线性波动方程,并用完全近似方法求出了该方程的近似解析解．     

一类非线性方程转向点问题的激波解

本文是讨论一类非线性方程的转向点问题 .研究了转向点的所处位置 ,以及问题激波解的渐近性态     

Solution to Nonlinear Wave Equation with Delta Initial Data and Its Singularity Structure

In this paper we discuss a Cauchy problem for nonlinear wave equation with delta initial data, including delta impulse and/or delta displacement. The solution of the Cauchy problem in appropriate sense is given. Meanwhile, the singularity structure of the solution is also described.     

一类非线性反应扩散方程及方程组的分数步长差分格式

对一类反应扩散方程及方程组的初边值问题提出分数步长差分格式．利用高阶差分算子的分解,以及先验估计的理论和技巧,得到次优阶ｌ２ 误差估计．     

一类非线性时滞偏差分方程正解的不存在性

本文研究了一类非线性时滞偏差分方程正解的不存在性,得到了方程不存在 正解的判据。     

关于K-S方程的非线性伽辽金方法(英文)

该文讨论了关于 K- S方程的伽辽金方法和非线性伽辽金方法的收敛性和 L2 误差估计 ,并得出误差阶一致的结论     

Compressible Limit of the Nonlinear Schr(o)dinger Equation with Different-Degree Small Parameter Nonlinearities

The authors study the compressible limit of the nonlinear Schr(o)dinger equation with different-degree small parameter nonlinearities in small time for initial data with Sobolev regularity before the formation of singularities in the limit system. On the one hand, the existence and uniqueness of the classical solution are proved for the dispersive perturbation of the quasi-linear symmetric system corresponding to the initial value problem of the above nonlinear Schr(o)dinger equation. On the other hand, in the limit system,it is shown that the density converges to the solution of the compressible Euler equation and the validity of the WKB expansion is justified.     

广义非线性Sin-Gordon方程的整体解及数值计算

本文考察了一类广义非线性Sin-Gordon方程的周期初值问题，利用非线性Galerkin方法，证明了其整体解的存在性和唯一性，并给出了其有界吸引集的存在性．构造了全离散的Fourier拟谱显格式，利用有界延拓法证明了其格式的收敛性与稳定性，并给出了误差估计、算法分析及计算复杂度，最后，通过数值例子，检验了理论结果的可信性．为对此模型的数值分析提供了理论基础和一个有效的算法．     

具非线性边界条件的非线性发展方程解的Blow up

讨论一类非线性发展方程具有非线性边界条件的初边值问题.在某些假设条件下,利用抛物型方程的最大值原理和凸性方法证明了其解在有限时间内具有爆破性质.     

一类非线性发展方程整体弱解的存在性和稳定性

该文考虑一类新的非线性方程(｜ut｜r-2ut)t-Δutt-Δu-ρ(t)Δut=f(u) 的初边值问题，利用小扰动法证明了整体弱解的 存在性，借用位势井的概念得到了解的稳定性.〖HT5”H〗关键词:〖HT5”SS〗非线性发展方程;初边值问题;整体弱解;稳定性.     

非线性Klein-Gordon方程的广义Jacobi谱配置方法

构造非线性Klein-Gordon方程的广义Jacobi谱配置格式,并给出相应收敛性分析.文中的方法和技巧为设计和分析各类线性与非线性偏微分方程的谱配置格式提供了有效的框架.     

Exact travelling wave solutions for the generalized nonlinear Schrödinger (GNLS) equation with a source by Extended tanh–coth, sine–cosine and Exp-Function methods

The capability of Extended tanh–coth, sine–cosine and Exp-Function methods as alternative approaches to obtain the analytic solution of different types of applied differential equations in engineering mathematics has been revealed. In this study, the generalized nonlinear Schrödinger (GNLS) equation is solved by three different methods. To obtain the single-soliton solutions for the equation, the Extended tanh–coth and sine–cosine methods are used. Furthermore, for this nonlinear evolution equation the Exp-Function method is applied to derive various travelling wave solution. Results show that while the first two procedures easily provide a concise solution, the Exp-Function method provides a powerful mathematical means for solving nonlinear evolution equations in mathematical physics.