二维阻尼非线性sine-Gordon方程的共形多辛Fourier拟谱格式

为二维阻尼非线性sine-Gordon方程构造了一个新的共形多辛Fourier拟谱格式.基于原系统的共形多辛哈密尔顿形式,首先在时间和空间方向上分别用辛中点和Fourier拟谱方法进行离散,得到一个全离散格式.随后证明了构造的格式保持离散的共形多辛守恒律.最后数值实验验证了格式的有效性.     

Zhiber-Shabat方程的多辛几何和多辛隐式格式研究

Zhiber-Shabat方程,描述许多重要的物理现象,是一类重要的非线性方程,有着许多广泛的应用前景.本文给出Zhiber-Shabat方程的多辛几何结构和多辛Fourier拟谱方法.数值算例结果表明多辛离散格式具有较好的长时间的数值稳定性.     

一类DGH方程的多辛Fourier拟谱方法

DGH方程作为一类重要的非线性方程有着许多广泛的应用前景.通过正则变化,构造了DGH方程的多辛哈密尔顿系统.利用Fourier拟谱方法对此哈密尔顿系统进行数值离散,并构造了一种半隐式的多辛格式.数值算例结果表明该多辛离散格式具有较好的长时间数值稳定性.     

Kolmogorov-Spieqel-Siveshinky方程大时间问题的Fourier拟谱逼近

该文讨论了Kolmogorov-Spieqel-Siveshinky方程的周期初值问题, 研究了半离散Fourier拟谱解的长时间行为, 证明了半离散系统的收敛性和整体吸引子的存在性. 构造了全离散的三层显式Fourier拟谱格式, 并证明了该格式的收敛性, 最后通过数值计算验证了格式的可信性. 数值结果表明: 该格式是长时间稳定并可取时间大步长. 作者模拟了方程的解在相空间的轨线, 得到了一些有意义的结论.     

三维涡度方程单向周期初边值问题的拟谱─有限差分方法

本文对三维涡度方程单向周期初边值问题建立了一种Fourier拟谱-有限差分格式,分析了其广义稳定性和收敛性,数值结果显示了这种方法的优点。     

六边形Fourier谱方法

首先,建立了晶格Fourier分析的一般理论,并具体研究了六边形区域上周期函数的数值逼近.在此基础上,提出了六边形区域上的椭圆型偏微分方程的周期问题求解的六边形Fourier谱方法,设计了相应谱格式快速实现算法,建立了Fourier谱方法的稳定性与收敛性理论.同方形区域上的经典Fourier谱方法一样,六边形Fourier谱方法可以充分利用快速Fourier变换,并具备了"无穷阶"的谱收敛速度.     

带乘性噪声的空间分数阶随机非线性Schrödinger方程的广义多辛算法

带乘性噪声的空间分数阶随机非线性Schrödinger方程是一类重要的方程,可应用于描述开放非局部量子系统的演化过程.该方程为一个无穷维分数阶随机Hamilton系统,且具有广义多辛结构和质量守恒的性质.针对该方程的广义多辛形式,在空间上采用拟谱方法离散分数阶微分算子,在时间上则采用隐式中点格式,构造出一类保持全局质量的广义多辛格式.对行波解和平面波解等进行数值模拟,结果验证了所构造格式的有效性和保结构性质,时间均方收敛阶约在0.5到1之间.     

广义KdV方程Fourier谱逼近的最优误差估计

分析了一类带周期边界条件的广义KdV方程Fourier谱方法,得到了L2范数下最优误差估计,改进了由Maday和Quarteroni给出的结果.还提出了一种修改Fourier拟谱方法,并且证明它享有与Fourier谱方法同样的收敛性.     

一类非线性Schr(o)dinger方程的守恒差分法与Fourier谱方法

考察了一类带导数项的非线性Schrodinger方程的周期边值问题，提出了一种守恒的差分格式，在空间方向上采用Fourier谱方法，证明了格式的稳定性和收敛性．数值试验得到了与理论分析一致的结果．     

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．     

Explicit Multi-symplectic Method for a High Order Wave Equation of KdV Type

In this paper, we consider multi-symplectic Fourier pseudospectral method for a high order integrable equation of KdV type, which describes many important physical phenomena. The multi-symplectic structure are constructed for the equation, and the conservation laws of the continuous equation are presented. The multisymplectic discretization of each formulation is exemplified by the multi-symplectic Fourier pseudospectral scheme. The numerical experiments are given, and the results verify the efficiency of the Fourier pseudospectral method.     

MULTISYMPLECTIC FOURIER PSEUDOSPECTRAL METHOD FOR THE NONLINEAR SCHRODINGER EQUATIONS WITH WAVE OPERATOR

In this paper, the multisymplectic Fourier pseudospectral scheme for initial-boundary value problems of nonlinear SchrSdinger equations with wave operator is considered. We investigate the local and global conservation properties of the multisymplectic discretization based on Fourier pseudospectral approximations. The local and global spatial conservation of energy is proved. The error estimates of local energy conservation law are also derived. Numerical experiments are presented to verify the theoretical predications.     

An exponential wave integrator Fourier pseudospectral method for the nonlinear Schrödinger equation with wave operator

In this article, an exponential wave integrator Fourier pseudospectral (EWI-FP) method is proposed for solving the nonlinear Schrödinger equation with wave operator. The numerical method is based on a Deuflhard-type exponential wave integrator for temporal integration and the Fourier pseudospectral method for spatial discretizations. The scheme is fully explicit and very efficient thanks to the fast Fourier transform. Numerical analysis of the proposed EWI-FP method is carried out and rigorous error estimates are established by means of the mathematical induction. Numerical results are reported to confirm the theoretical studies.     

Burgers方程的一个三层Fourier拟谱格式

1. 引言 谱方法为非线性偏微分方程的求解提供了新的技巧.由于拟谱方法比谱方法便于实施,计算量小,所以应用更为广泛.但它有时会产生非线性不稳定性.为此,一些滤波和抑制方法接连出现.本文对Burgers方程的周期边界问题,建立了一个带抑制算子的三层拟谱格式,同时证明了格式的广义稳定性.在一定的条件下,由此稳定性可得到收敛性。     

Multi-Symplectic Fourier Pseudospectral Method for a Higher Order Wave Equation of KdV Type

The higher order wave equation of KdV type, which describes many important physical phenomena, has been investigated widely in last several decades. In this work, multi-symplectic formulations for the higher order wave equation of KdV type are presented, and the local conservation laws are shown to correspond to certain well-known Hamiltonian functionals. The multi-symplectic discretization of each formulation is calculated by the multi-symplectic Fourier pseudospectral scheme. Numerical experiments are carried out, which verify the efficiency of the Fourier pseudospectral method.     

一类非线性伪抛物型方程的伪谱解法

本文考虑了一类非线性伪抛物型方程的Fourier伪谱方法,建立了该方程的Fourier伪谱方法的半离散格式和全离散格式．并利用Sobolev空间的正交映射理论,给出了这两种格式的误差估计．最后针对全离散格式给出了数值算例,数值结果表明Fourier伪谱格式能正确加解密,且计算误差较小,效率较高,具有较好的稳定性,可用于提高热流密码体制的加解密效率．     

A Fourier pseudospectral method for a generalized improved Boussinesq equation

In this article, we propose a Fourier pseudospectral method for solving the generalized improved Boussinesq equation. We prove the convergence of the semi‐discrete scheme in the energy space. For various power nonlinearities, we consider three test problems concerning the propagation of a single solitary wave, the interaction of two solitary waves and a solution that blows up in finite time. We compare our numerical results with those given in the literature in terms of numerical accuracy. The numerical comparisons show that the Fourier pseudospectral method provides highly accurate results. © 2014 Wiley Periodicals, Inc. Numer Methods Partial Differential Eq 31: 995–1008, 2015     

A fourth-order split-step pseudospectral scheme for the Kuramoto-Tsuzuki equation

The numerics of the Kuramoto-Tsuzuki equation is dealt with in this paper. We propose a split-step Fourier pseudospectral discretization for solving the problem, which is split into one linear subproblem and one nonlinear subproblem. The nonlinear subproblem is integrated exactly via solving the equations for the amplitude and phase angle of the unknown complex-valued function respectively. The linear subproblem is first approximated by Fourier pseudospectral discretization to the spatial derivative, and then integrated exactly in phase space via solving the equations for the Fourier coefficients analytically. We apply a fourth-order splitting integration in time advances, and therefore the overall error in space discretization is of spectral order and the overall error in time discretization is of fourth order which merely comes from the splitting. The scheme is fully explicit, easy to implement and quite efficient thanks to FFT. Moreover, it is time reversible and gauge invariant which are two properties in the continuous problem. Extensive numerical results are reported, which are geared towards testing the convergence and demonstrating the efficiency and accuracy.     

广义混合非线性Schr？dinger方程的拟谱方法

本文讨论了广义混合非线性Schrodinger方程的周期初值问题,构造了守恒的半离散Fourier拟谱格式,对其近似解进行了先验估计,并证明了格式的收敛性.证明了该方程存在孤立子解,并给出其孤立子解的精确表达式.研究了线性化方程的稳定性问题,即在初值有扰动的情况下,该方程只有振荡解和鞍点.最后,通过数值例子验证了格式的可信性,数值计算表明,本格式时间方向可取大步长且是长时间稳定的,我们还计算了孤立子解,并绘出了在初值有扰动的情况下,相空间的轨线图.