离散广义系统的区间矩阵平稳振荡

利用范数理论和代数方法,研究了离散广义系统的区间平稳振荡问题．给出了两种区间矩阵平稳振荡存在的充分条件．提供了可行性的算例．     

一类时变大系统的区间矩阵平稳振荡

一类时变大系统的区间矩阵平稳振荡王美娟（上海机械学院基础部，上海２０００９３）在文献［１］中，我们讨论了具有分解的大系统的区间矩阵平稳振荡问题．其中Ａｓｓ为ｎｓ×ｎｓ阶实常量矩阵．平均法是用来解决时变系统问题的很有成效的一种方法．它使我们有可能从常数...     

区间周期系统的平稳振荡

本文给出了区间周期系统平稳振荡的概念，建立了区间矩阵稳定性与区间周期系统平稳振荡之间的关系，推广和改进了文[1]的结果．     

求高阶差等比数列通项的公式解法

通过对高阶差等比数列通项公式的构成形式进一步研究,得到了该类数列通项公式的标准形式．并利用矩阵的初等变换以及差分的方法导出了求该数列通项公式中各系数的计算公式,从而得到了求高阶差等比数列通项公式及前n项和的一种公式解法．     

分块带状矩阵的逆

1引言如果分块矩阵A=(A_(ij))_(n×n)满足A_(ij)=O(j-i＞p且i-j＞q),其中A_(ij)为m阶矩阵,则称A为(p,q)-分块带状矩阵．分块带状矩阵在一些实际问题中经常出现,例如在量子场论中用途很广的非线性Schr(?)dinger方程的差分离散问题,解热传导问题等,都会遇到分块带状矩阵．常见的分块三对角矩阵,分块五对角矩阵都是特殊的分块带状矩阵．采用通常的方法求解分块带状矩阵的逆矩阵时,需要进行O(n~3)次m阶矩阵的运算．本文首先将分块带状矩阵扩充成可逆的分块上(下)三角矩阵,利用其逆矩阵导出了分块带状矩阵的逆矩阵表达式;进而利用所得到的公式分别推导了分块三对角矩阵及分块五对角矩阵的逆矩阵的快速算法,所需运算量为O(n~2)次m阶矩阵的运算．本文的结果扩充了文[1]等关于分块三对角阵求逆的相关结果．     

非线性对流扩散方程的UNO-MMOCAA差分方法

本文把MMOCAA差分方法与UNO插值相结合，提出了求解对流占优扩散问题的UN0—MMOCAA差分方法，它避免了基于高次(≥2)Lagrange插值的MMOCAA差分方法在方程解的陡峭前沿附近产生的振荡．本文通过引入辅助插值算于等方法，给出了非线性UNO—MMOCAA差分格式的误差分析．数值例子表明新格式无振荡。     

差分代换矩阵与多项式的非负性判定

主要分析了差分代换矩阵的基本性质,证明了存在有限个差分代换矩阵的乘积可以将单位点$(1,0,\cdots,0)$变换到指定的非负(本原)整点.利用这一结果可以导出${R^n_+}$上判定半正定型的充要条件.根据此充要条件建立的算法(TSDS)可能不停机,针对不停机的情况,再给出一些判定半正定型的充分条件.     

关于热传导方程半离散差分格式的一个注记

本文研究了热传导方程初边值问题的半离散化差分格式直接解算法.分别从Dirichlet和Neumann边界条件出发,直接由空间差分格式导出与时间相关的一阶常微分方程组,随后通过正/余弦变换获得了原方程的半解析解,并给出了相关收敛性分析.并对中心差分格式和紧差分格式的精度差异,通过矩阵特征值理论给出了相关原因分析.另外,对于二维热传导方程初边值问题,应用矩阵张量积运算,该直接解算法可直接演变成二重正(余)弦变换.该方法由于不涉及时间上的离散,从而具有较好的计算效率.     

二阶非线性差分方程的Riccati变换

本文使用Ｒｉｃｃａｔｉ变换研究了一类二阶非线性差分方程的振荡性．     

三维浮式结构的流固耦合动力特性分析

对于采用位移-压力有限元格式从流固耦合系统导出的大型非对称矩阵特征值问题,构造出了一种新格式的迭代Arnoldi方法进行非对称特征值分析来获得浮式结构的动力特性．该迭代格式在克服零频的移频技术中,可以高效地计算出Arnoldi向量．实例分析结果表明,流固耦合作用对水上大型薄壁浮式结构动力特性具有重要影响．     

Invariant difference schemes for the Ermakov system

We construct invariant difference schemes for the parametric system of Ermakov equations. By using a difference analog of the Noether theorem, we write out the first three difference integrals of the system. The obtained schemes are integrable exactly to the same extent to which the original differential system is integrable.     

Newton Generalized Hessenberg method for solving nonlinear systems of equations

In this paper, we give and analyze a Finite Difference version of the Generalized Hessenberg (FDGH) method. The obtained results show that applying this method in solving a linear system is equivalent to applying the Generalized Hessenberg method to a perturbed system. The finite difference version of the Generalized Hessenberg method is used in the context of solving nonlinear systems of equations using an inexact Newton method. The local convergence of the finite difference versions of the Newton Generalized Hessenberg method is studied. We obtain theoretical results that generalize those obtained for Newton-Arnoldi and Newton-GMRES methods. Numerical examples are given in order to compare the performances of the finite difference versions of the Newton-GMRES and Newton-CMRH methods. This revised version was published online in June 2006 with corrections to the Cover Date.     

一维空气动力学方程组解的局部存在性及其数值计算

一、引言本文讨论了下面的空气动力学方程组:     

An operator splitting method with FDM and FEM for the convection- diffusion equation using boundary-fitted coordinate system

An operator splitting method combining finite difference method and finite element method is proposed in this paper by using boundary-fitted coordinate system. The governing equation is split into advection and diffusion equations and solved by finite difference method using boundary-fitted coordinate system and finite element method respectively. An example for which analytic solution is available is used to verified the proposed methods and the agreement is very good. Numerical results show that it is very efficient.     

Numerical solution of a quasilinear parabolic problem

A combined approach of linearisation techniques and finite difference method is presented for obtaining the numerical solution of a quasilinear parabolic problem. The given problem is reduced to a sequence of linear problems by using the Picard or Newton methods. Each problem of this sequence is approximated by Crank-Nicolson difference scheme. The solutions of the resulting system of algebraic equations are obtained by using Block-Gaussian elimination method. Two numerical examples are solved by using both linearisation procedures to illustrate the method. For these examples, the Newton method is found to be more effective, especially when the given nonlinear problem has steep gradients.     

一类复差分方程组的解的增长级（英文）

In this paper, using Nevanlinna theory of the value distribution of meromorphic functions, the problem of growth order of solutions of a class of system of complex difference equations is investigated, some results are improved and generalized. More precisely,some results of the growth order of solutions of system of differential equations to difference equations are extended.     

Finite difference reaction–diffusion equations with nonlinear diffusion coefficients

Summary. A monotone iterative method for numerical solutions of a class of finite difference reaction-diffusion equations with nonlinear diffusion coefficient is presented. It is shown that by using an upper solution or a lower solution as the initial iteration the corresponding sequence converges monotonically to a unique solution of the finite difference system. It is also shown that the solution of the finite difference system converges to the solution of the continuous equation as the mesh size decreases to zero. Received February 18, 1998 / Revised version received April 21, 1999 / Published online February 17, 2000     

The structure of the spectrum of a system of difference equations

In this paper, we investigate the structure of the discrete spectrum of the system of non-selfadjoint difference equations of first order using the uniqueness theorems of analytic functions. We also obtained the sufficient conditions on coefficients of this system under which its discrete spectrum is finite.     

Dynamics of four coupled phase-only oscillators

We study the dynamics of a system of four coupled phase-only oscillators. This system is analyzed using phase difference variables in a phase space that has the topology of a three-dimensional torus. The system is shown to exhibit numerous phase-locked motions. The qualitative dynamics are shown to depend upon a parameter representing coupling strength. This work has application to MEMS artificial intelligence decision-making devices.     

Linking systems of difference sets

A linking system of difference sets is a collection of mutually related group difference sets, whose advantageous properties have been used to extend classical constructions of systems of linked symmetric designs. The central problems are to determine which groups contain a linking system of difference sets, and how large such a system can be. All previous constructive results for linking systems of difference sets are restricted to 2‐groups. We use an elementary projection argument to show that neither the McFarland/Dillon nor the Spence construction of difference sets can give rise to a linking system of difference sets in non‐2‐groups. We make a connection to Kerdock and bent sets, which provides large linking systems of difference sets in elementary abelian 2‐groups. We give a new construction for linking systems of difference sets in 2‐groups, taking advantage of a previously unrecognized connection with group difference matrices. This construction simplifies and extends prior results, producing larger linking systems than before in certain 2‐groups, new linking systems in other 2‐groups for which no system was previously known, and the first known examples in nonabelian groups.