利用模糊系统求解非线性Fredholm-Ⅱ积分方程

提出了一种利用模糊系统求解非线性Fredholm-Ⅱ积分方程解析解的方法:首先将积分方程转化为模糊系统,然后利用具有紧支集和正规性的尺度函数构造模糊基函数和积分方程的模糊解,最后构造能量误差函数,通过最小化误差函数学习模糊系统的参数.数值实验表明:用模糊系统求得的便于运算的解析解比用Galerkin方法求得的数值解精度高.     

双解析函数、双调和函数和平面弹性问题

通过考虑双解析函数和双调和函数的关系,对单连通区域上平面弹性问题中只有重力体力作用的应力函数建立了唯一性和存在性结果;并对单位圆区域得到了类似于Poisson公式解的积分表示式。     

一类对偶积分方程组正则化为第一类含对数核的Fredholm奇异积分方程组解法

引入辅助未知函数及辅助未知函数的积分关系式,表示原未知函数,将对偶积分方程组退耦.应用Sonine第一有限积分公式,实现化为Abel型积分方程组,应用Abel反演变换并化简,正则化为含对数核的第一类Fredholm奇异积分方程组.由此给出奇异积分方程组的一般性解,进而获得对偶积分方程组的解析解,同时严格地证明了,对偶积分方程组和由它化成的含对数核的奇异积分方程组的等价性,以及对偶积分方程组解的存在性和唯一性.     

厚件压缩滑移线场的参变量积分问题

本文提出一种可使厚件压缩获得解析解的参变量积分方法.对传统数值计算找到了φ与y的函数关系,从而可用参量积分求得解析解.l/h=0.121的滑移线场算例表明参量积分结果与数值计算结果基本一致,在理论上表明厚件压缩滑移线场求得解析解完全可能.     

一类复合材料焊接的界面裂纹问题

利用复变方法和解析函数边值问题的基本理论，研究一类复合材料焊接线上出现裂纹的平面弹性基本问题，笔者通过适当的函数分解和积分变换，将寻找复应力函数的问题转化为求解一正而型奇异积分方程，并借助积分方程理论给出了方程的求解方法。     

关于某些函数积分方程的解析解

在本文中,我们给出了函数积分方程(1)—(3)解析解的存在唯一性和渐近性定理。在文献[1]和[2]中分别给出了下面三类函数积分方程     

抛物线模拔速度场的曲线积分问题

文章采用ｖｏｎＫａｒｍａｎ基本假设对模面函数为抛物线（又称喇叭模）的拔制问题设定了运动许可速度场，并经曲线积分与变上限积分得到拔制力的上界解析解。     

双参数地基上Reissner板弯曲问题的边界积分方程

本应用广义函数的Ｆｏｕｒｉｅｒ积分变换，导出了双参数地基上Ｒｅｉｓｓｎｅｒ板弯曲问题的两个基本解。在此基础上，从虚功原理出发，依据胡海昌导出的Ｒｅｉｓｓｎｅｒ板弯曲理论，推导出适用于任意形状，任意荷载，任意边界条件情形的三个边界积分方程，为边界元法在这一问题中的应用提供了理论基础。中给出了固支、简支、自由三类边界的算例，并与解析解比较，均得到满意的结果。     

双参数地基上Reisner板弯曲问题的边界积分方程

本文应用广义函数的Ｆｏｕｒｉｅｒ积分变换，导出了双参数地基上Ｒｅｉｓｓｎｅｒ板弯曲问题的两个基本解·在此基础上，从虚功原理出发，依据胡海昌导出的Ｒｅｉｓｓｎｅｒ板弯曲理论，推导出适用于任意形状、任意荷载、任意边界条件情形的三个边界积分方程，为边界元法在这一问题中的应用提供了理论基础·文中给出了固支、简支、自由三类边界的算例，并与解析解比较，均得到满意的结果·     

双正则函数向量的带Haseman位移带共轭值的线性及非线性边值问题

首先利用积分方程的方法和Arzela-Ascoli定理讨论了实Clifford分析中双正则函数向量的带Haseman位移带共轭值的非线性边值问题解的存在性及其积分表达式,其次利用压缩映射原理解决了其线性边值问题解的存在唯一性及其积分表达式.     

The Higher Derivatives of Bianalytic Functions

Bianalyticfunctionsisanewkif1doffunctionspresentedrecently-PapersL1j'[2Jdls-cussedson1ebaslcpropertiesofbianalyticfunctions-Inthispaper,wewillgetthehigherdt'rivD'-tivesandWeierstrassTheorembytheresultsofpapers[lj.[2j.5l.TheFormulaofHigherDerivativesFromF2j,wehavetherepresentatlonformulaofbianalytlcfu11ctionsProvidedthattheintegralcanbedifferentiatedunderthesignofintegrationwefi11dFronlti1edefinitionofthe(ierivativeofl)ia11alyticfu11ctionlwehaveWearegoingtc)IJrovetlIeaboveformulainfollowi…     

双解析函数的一般复合边值问题关于边界曲线的稳定性

开口弧段Γ上的双解析函数的Riemann边值问题与单位圆周L上双解析函数的Hilbert边值问题复合而成的一般复合边值问题,当L与Γ发生微小的光滑摄动后,借助于推广的拉甫伦捷夫近似于圆的共形映射,将星形域映为单位圆域,从而得出摄动后的问题的解的表达式,同时讨论了解的稳定性情况,并给出误差估计.     

圆内平面弹性问题的边界积分公式

根据双解析函数可以得到单位圆内平面弹性问题应力函数的边界积分公式,但式中包含强奇异积分,不能用于直接计算．将边界上的应力函数展开为Fourier级数,再利用广义函数论中的几个公式进行卷积计算,可以得到不含强奇异积分核的边界积分公式,通过边界的应力函数值和法向导数的积分,直接得到圆内应力函数值,并给出几个算例,表明该结果用于求解单位圆内平面弹性问题十分方便．     

A.V. Bitsadze's observation on bianalytic functions and the Schwarz problem

According to an observation of A.V. Bitsadze from 1948 the Dirichlet problem for bianalytic functions is ill-posed. A natural boundary condition for the polyanalytic operator, however, is the Schwarz condition. An integral representation for the solutions in the unit disc to the inhomogeneous polyanalytic equation satisfying Schwarz boundary conditions is known. This representation is extended here to any simply connected plane domain having a harmonic Green function. Some other boundary value problems are investigated with some Dirichlet and Neumann conditions illuminating that just the Schwarz problem is a natural boundary condition for the Bitsadze operator.     

On solving the second basic three-element boundary-value Carleman-type problem in classes of bianalytic functions in a disk

In this paper, we investigate one of the basic Carleman-type boundary-value problems for bianalytic functions. We obtain a constructive method for solving the problem in the case of circular domain. We establish that solving the problem can be reduced to a sequential solving two generalized Carleman-type problems for analytic functions in a disk. __________ Translated from Lietuvos Matematikos Rinkinys, Vol. 46, No. 3, pp. 413–426, July–September, 2006.     

改进的无奇异局部边界积分方程方法

在局部边界积分方程方法中,当源节点位于分析域的整体边界上时,局部边界积分将出现奇异积分问题,这些奇异积分需要做特别的处理．为此,提出了对域内节点采用局部积分方程,而对边界节点直接采用移动最小二乘近似函数引入边界条件来解决奇异积分问题,这同时也解决了对积分边界进行插值引入近似误差的问题．作为应用和数值实验,对Laplace方程和Helmholtz方程问题进行了分析,取得了很好的数值结果．进而,在Helmholtz方程求解中,采用了含波解信息的修正基函数来代替单项式基函数进行近似．数值结果显示,这样处理是简单高效的,在高波数声传播问题的求解中非常具有前景．     

3‐D Contact problems for elastic wedges with Coulomb friction

3‐D quasi‐static contact problems for elastic wedges with Coulomb friction are reduced to integral equations and integral inequalities with unknown contact normal pressures. To obtain these equations and inequalities, Green's functions for the wedges, where one face of the wedges is either stress‐free or fixed, are needed. Using Fourier and Kontorovich–Lebedev integral transformations, all the stresses and displacements in the wedges can be constructed in terms of solutions of Fredholm integral equations of the second kind on the semiaxis. The Green's functions can be calculated as uniformly convergent power series in (1‐2ν), where νis Poisson's ratio. An exponential decay of the kernels and right‐hand sides of the Fredholm integral equations provides the applicability of the collocation method for simple and fast calculation of the Green's functions. For a half‐space, which is a special case of an elastic wedge, the kernels degenerate and the functions reduce to the well‐known Boussinesq and Cerruti solutions. Analysing the contact problems reveals that the Green's functions govern the kernels of the above mentioned integral equations and inequalities. Under the assumption that the punch has a smooth shape, the contact pressure is zero on the boundary of the unknown contact zone. Solving the contact problems with the help of the Galanov–Newton method, the normal contact pressure, the contact zone and the normal displacement around the contact zone can be determined simultaneously. In view of the numerical results, the influence of the friction forces on the punch force and the punch settlement is discussed. Copyright © 2004 John Wiley & Sons, Ltd.     

High-Accuracy Numerical Approximations to Several Singularly Perturbed Problems and Singular Integral Equations by Enriched Spectral Galerkin Methods

Usual spectral methods are not effective for singularly perturbed problems and singular integral equations due to the boundary layer functions or weakly singular solutions. To overcome this difficulty, the enriched spectral-Galerkin methods (ESG) are applied to deal with a class of singularly perturbed problems and singular integral equations for which the form of leading singular solutions can be determined. In particular, for easily understanding the technique of ESG, the detail of the process are provided in solving singularly perturbed problems. Ample numerical examples verify the efficiency and accuracy of the enriched spectral Galerkin methods.