分步傅里叶法求解广义非线性薛定谔方程的改进及精度分析

利用分步傅里叶算法求解广义非线性薛定谔方程时对非线性项的处理往往采取了较多的数值近似,而且需要特别小心选择空间和时间的步长以及窗口尺寸,以保证精度要求.以描述光子晶体光纤中超连续谱产生的广义非线性薛定谔方程为例,利用分步傅里叶方法求解时对非线性项直接采用积分处理,而不采取任何数学近似,数值计算时又将积分变成卷积利用傅里叶变换求解,从而方便而又精确地完成了非线性项的计算.整个过程没有任何人为的近似,从而保证了计算模型的精确度.同时,还对因步长选择引起的计算精度进行了分析,提出了从频谱图上判断空间、时间步长选 关键词： 非线性光学 广义非线性薛定谔方程 分步傅里叶方法 超连续谱产生     

基于DCS5格式的LDDRK算法

基于五阶线性耗散紧致格式(DCS5)和七级龙格原库塔时间积分算法,根据数值增长因子对精确增长因子的最佳逼近原则,提出与DCS5格式耗散性相适应的优化方法,并得到相应的七级五阶低耗散低色散龙格原库塔(LDDRK)算法.求解标量线性对流方程和线化Euler方程得到的一维波传播问题的数值结果显示,七级五阶LDDRK算法的精度优于七级七阶精度的标准龙格原库塔算法.     

单模锥体光纤传输特性的数值分析

本文采用含有轴向坐标参变量的标量波动方程来描写锥体光纤,通过一种简单的变换,将标量波动方程化为一阶微分方程组。用四阶龙格——库塔法的基尔改进式,计算了单模锥体光纤的传输特性。     

一维双曲守恒律的龙格-库塔控制体积间断有限元方法

给出数值求解一维双曲守恒律方程的新方法——龙格-库塔控制体积间断有限元方法(RKCVDFEM),其中空间离散基于控制体积有限元方法,时间离散基于二阶TVB Runge-Kutta技术,有限元空间选取为分段线性函数空间.理论分析表明,格式具有总变差有界(TVB)的性质,而且空间和时间离散形式上具有二阶精度.数值算例表明,数值解收敛到熵解并且对光滑解的收敛阶是最优的,优于龙格-库塔间断Galerkin方法(RKDGM)的计算结果.     

静电六极装置电场分布的数值计算方法及在N2O分子转动态选择、取向中的应用

阐述求解极性分子转动态选择及取向静电六极装置中势能分布、电场分布的数值计算方法.为了获得电场分布公式,需通过数值迭代求解势能满足的Laplace方程,获取数值分布点,通过数值分布点,由待定系数的多级展开势能解析表达式进行最小二乘拟合获得势能分布公式,由势能对空间向量的微分获得电场分布.分子在六极电场中的运行轨迹采用经典Newton方程描述,并通过四阶龙格-库塔方法(Four Order Runge-Kutta Method)实现数值求解,其中能量处理采用量子力学方法.应用此方法给出静电六极装置的电场分布公式,运用获得的电场分布公式计算和讨论电场对极性分子N₂O的静电六极转动态选择、取向所带来的影响.     

逆算符方法求解非线性动力学方程及其一些应用实例

首先简介逆算符方法及如何实现对它的数学机械化;然后用逆算符方法研究了三个典型的非线性方程:Lorentz方程,广义Duffing方程和双耦合广义Duffing方程。用四阶龙格-库塔方法进行比较,说明逆算符方法比龙格-库塔方法具有更高的精度和更快的收敛性。本文把逆算符方法应用于混沌行为的研究,并将此法在微机上实现了数学机械化。该法有很大的普适性,特别适用于对复杂问题的定量计算,大有应用和发展前途。 关键词：     

PPV中极化子动力学方程的龙格-库塔求解

构造求解-阶微分方程组初值问题的八阶龙格-库塔递推公式,结合描述有机分子运动的-维紧束缚模型,研究PPV原子链中极化子的形成及运动.对碳原子数N=160的PPV原子链,由可控步长八阶龙格-库塔公式求解2N(2N+1)=102720个方程组成的方程组,用Fortran语言编程计算,得到稳定的极化子结构和运动图像;在场强E=1×105V·cm^-1的电场作用下,极化子沿分子链的运动速率约为0.2635Å·fs^-1.计算结果表明,八阶龙格-库塔方程可以有效地用于有机分子链中载流子运动的模拟.     

单个球形生物质颗粒热解过程的数值模拟

本文对单个球形生物质颗粒的热解过程进行数值模拟．利用双倒易边界元法和四阶龙格-库塔方法分别对非线性的导热方程和化学反应动力学方程组进行求解．讨论了生物质颗粒的大小与环境温度对热解时间和热解产物中相关组分质量分数的影响．     

基于浸入边界-多松弛时间格子玻尔兹曼通量求解法的流固耦合算法研究

针对流固耦合问题,发展了基于浸入边界-多松弛时间格子玻尔兹曼通量求解法(immersed boundary method multi-relaxation-time lattice Boltzmann flux solver,IB-MRT-LBFS)的弱耦合算法.依据多尺度Chapman-Enskog展开,建立不可压宏观方程状态变量和通量与格子玻尔兹曼方程中粒子密度分布函数之间的关系;采用强制浸入边界法处理流固界面使固壁表面满足无滑移边界条件,根据修正的速度求解动量方程力源项;结构运动方程采用四阶龙格-库塔法求解.格子模型与浸入边界法的引入使流固耦合计算可以在笛卡尔网格下进行,无需生成贴体网格及运用动网格技术,简化了计算过程.数值模拟了单圆柱横向涡激振动、单圆柱及串列双圆柱双自由度涡激振动问题.结果表明,IB-MRT-LBFS能够准确预测圆柱涡激振动的锁定区间、振动响应、受力情况以及捕捉尾流场结构形态,验证了该算法在求解流固耦合问题的有效性和可行性.     

非均匀掺铒光纤中的可控呼吸子与多峰孤子

研究了耦合广义非均匀非线性薛定谔-麦克斯韦-布洛赫方程所描述的非均匀掺铒光纤系统中不同非线性局域波的色散与非线性管理问题.利用相似变换求解非均匀非线性薛定谔-麦克斯韦-布洛赫方程,得到一个非自治的通解形式.该解在非均匀掺铒光纤系统中包含了众多的非线性局域波结构.从非线性局域波的复现与相移非线性局域波考虑,在色散与非线性管理系统下分析了呼吸子和多峰孤子的动力学特性.结果表明在非均匀掺铒光纤系统中存在新的非线性局域波结构,并且在色散与非线性管理系统下非线性局域波的结构呈现多样性,这对实际的光纤通信理论有参考意义.     

Generalized linear Schrödinger equations and their Darboux transformations

We construct explicit Darboux transformations of arbitrary order for a class of generalized, linear Schrödinger equations. Our construction contains the well-known Darboux transformations for Schrödinger equations with position-dependent mass, Schrödinger equations coupled to a vector potential and Schrödinger equations for weighted energy.     

On the characterization of vector rogue waves in two-dimensional two coupled nonlinear Schrödinger equations with distributed coefficients

We construct vector rogue wave solutions of the two-dimensional two coupled nonlinear Schrödinger equations with distributed coefficients, namely diffraction, nonlinearity and gain parameters through similarity transformation technique. We transform the two-dimensional two coupled variable coefficients nonlinear Schrödinger equations into Manakov equation with a constraint that connects diffraction and gain parameters with nonlinearity parameter. We investigate the characteristics of the constructed vector rogue wave solutions with four different forms of diffraction parameters. We report some interesting patterns that occur in the rogue wave structures. Further, we construct vector dark rogue wave solutions of the two-dimensional two coupled nonlinear Schrödinger equations with distributed coefficients and report some novel characteristics that we observe in the vector dark rogue wave solutions.     

Nondegenerate soliton solutions in certain coupled nonlinear Schrödinger systems

In this paper, we report a more general class of nondegenerate soliton solutions, associated with two distinct wave numbers in different modes, for a certain class of physically important integrable two component nonlinear Schrödinger type equations through bilinearization procedure. In particular, we consider coupled nonlinear Schrödinger (CNLS) equations (both focusing as well as mixed type nonlinearities), coherently coupled nonlinear Schrödinger (CCNLS) equations and long-wave-short-wave resonance interaction (LSRI) system. We point out that the obtained general form of soliton solutions exhibit novel profile structures than the previously known degenerate soliton solutions corresponding to identical wave numbers in both the modes. We show that such degenerate soliton solutions can be recovered from the newly derived nondegenerate soliton solutions as limiting cases.     

Inverse scattering method and vector higher order non-linear Schrödinger equation

A generalized inverse scattering method has been developed for arbitrary n-dimensional Lax equations. Subsequently, the method has been used to obtain N-soliton solutions of a vector higher order non-linear Schrödinger equation, proposed by us. It has been shown that under a suitable reduction, the vector higher order non-linear Schrödinger equation reduces to the higher order non-linear Schrödinger equation. An infinite number of conserved quantities have been obtained by solving a set of coupled Riccati equations. Gauge equivalence is shown between the vector higher order non-linear Schrödinger equation and the generalized Landau–Lifshitz equation and the Lax pair for the latter equation has also been constructed in terms of the spin field, establishing direct integrability of the spin system.     

Optical Solitonlike Pulses for Nonlinear Schrödinger Equation with Variable Coefficients

The generalized form with varying coefficients for nonlinear Schrödinger equation including fourth-order dispersion and quintic nonlinearity is presented in this article. The exact bright, dark, and combined solitonlike solutions were given by taking proper ansatz into account. The different forms of dispersion functions were considered to investigate the pulse's evolution or dispersion managements in optical fiber.     

双芯光纤孤子开关及其势函数研究

根据耦合非线性薛定谔方程研究孤子在双芯光纤中的传输,讨论了两芯具有不同增益或损耗的双芯光纤孤子开关特性。并用势函数的概念解释孤子在双芯光纤中的传输与开关行为。     

Temporal structure of a supercontinuum generated under pulsed and CW pumping

The numerical simulation based on the solution to the generalized nonlinear Schrödinger equation is used to analyze various regimes of the supercontinuum generation in optical fibers under pulsed and CW excitation. The time dependences of the supercontinuum intensity are studied, and the optimal generation regimes are discussed with respect to various applications of the supercontinuum.     

New extended auxiliary equation method for finding many new Jacobi elliptic function solutions of three nonlinear Schrödinger equations

In this paper, we construct many new types of Jacobi elliptic function solutions of nonlinear evolution equations using the so-called new extended auxiliary equation method. The effectiveness of this method is demonstrated by applications to three higher order nonlinear evolution equations, namely, the higher order nonlinear Schrödinger equation with derivative non-Kerr nonlinear terms, the higher order dispersive nonlinear Schrödinger equation and the generalized nonlinear Schrödinger equation. The solitary wave solutions and periodic solutions are obtained from the Jacobi elliptic function solutions. Comparing our new results and the well-known results are given.     

Darboux transformations for a system of coupled discrete Schrödinger equations

Darboux transformations and a factorization procedure are presented for a system of coupled finite-difference Schrödinger equations. The conformity between generalized Darboux transformations and the factorization method is established. Factorization chains and consequences of Darboux transformations are obtained for a system of coupled discrete Schrödinger equations. The proposed approach permits constructing a new series of potential matrices with known spectral characteristics for which coupled-channel discrete Schrödinger equations have exact solutions.