ISOTROPICALIZED SPLINE INTEGRAL EQUATION METHOD FOR THE ANALYSIS OF ANISOTROPIC PLATES

In the view of Reissner's and Kirchhoff's theories, respectively, we formulate the isotropicalized governing equations for the anisotropic plates, and give the proof of the equivalence relation between these two plate-models for the simply-supported rectangular orthotropic plates. The well-known fundamental solutions of the isotrqpic plates are utlized for the spline integral equation analysis of anisotropic plates.Even with sparse meshes the satisfactory results can be obtained. The analysis of plates on two-parameter elastic foundation is so simple as the common case that only a few terms should be added to the formulas of fictitious loads.

A SOLVING METHOD FOR A SYSTEM OF PARTIAL DIFFERENTIAL EQUATIONS WITH AN APPLICATION TO THE BENDING PROBLEM OF A THICK PLATE

A theorem of solving a system of linear non-homogeneous differential equations through integrating and adding its basic solutions is put forward and proved, the mathematical role and physical nature of the theorem is interpreted briefly. As an example, the theorem is applied to solve the problem of thermo-force bending of a thick plate.

EQUIVALENT BOUNDARY INTEGRAL EQUATIONS WITH INDIRECT UNKNOWNS FOR THIN ELASTIC PLATE BENDING THEORY

Equivalent Boundary Integral Equations (EBIE) with indirect unknowns for thin elastic plate bending theory, which is equivalent to the original boundary value problem, is established rigorously by mathematical technique of non-analytic continuation and is fully proved by means of the variational principle. The previous three kinds of boundary integral equations with indirect unknowns are discussed thoroughly and it is shown that all previous results are not EBIE.

MULTIPLE RECIPROCITY METHOD WITH TWO SERIES OF SEQUENCES OF HIGH-ORDER FUNDAMENTAL SOLUTION FOR THIN PLATE BENDING

The boundary value problem of plate bending problem on two_parameter foundation was discussed.Using two series of the high_order fundamental solution sequences, namely, the fundamental solution sequences for the multi_harmonic operator and Laplace operator, applying the multiple reciprocity method(MRM), the MRM boundary integral equation for plate bending problem was constructed. It proves that the boundary integral equation derived from MRM is essentially identical to the conventional boundary integral equation. Hence the convergence analysis of MRM for plate bending problem can be obtained by the error estimation for the conventional boundary integral equation. In addition, this method can extend to the case of more series of the high_order fundamental solution sequences.

用微分求积法求解梁的弹塑性问题

根据梁塑性弯曲的工程理论,采用微分求积法进行了梁的弹塑性平面弯曲分析。微分求积法是一种直接求解微分方程(组)的数值方法,不依赖于变分原理,且能以较少的网格点求得微分方程的高精度数值解。与有限元分析结果的比较,表明了微分求积法求解梁的弹塑性问题的计算效率和精度。微分求积法的计算结果不受荷载步长的限制,也不需要迭代求解,特别对于承受非线性分布荷载作用的梁的弹塑性分析具有很大的优越性。通过选用不同的网格点数目,分析了微分求积法的稳定性和收敛性。

弹性薄板弯曲问题的等价的直接变量边界积分方程

建立平面弹性薄板弯曲问题理论中具有直接变量的等价边界积分方程。传统的直接变量边界积分方程,它们都不是等价的,对此进行了深入的讨论。

弹性薄板弯曲问题的等价的边界积分方程

用非解析开拓数学方法建立平面弹性薄板弯曲问题理论中具有间接变量的等价边界积分方程 ,并采用变分法进行了严格的说明· 以往出现的三种间接变量边界积分方程 ,它们都不是等价的 ,对此我们进行了深入的讨论·

样条积分方程法分析弹塑性板弯曲

基于形变理论和Mises准则本文用虚载法分别导出Reissner型和Kirchhoff型板弹塑性弯曲方程,对它们间在多边形简支和轴对称弯曲下的相通性给出论证,并用弹性板样条积分方程法来求解,对诸如塑性域的范围和深度以及各点的弹塑性内力和位移等即使在稀疏剖分下也能有良好的计算精度。

边界无单元法计算薄板弯曲问题

无单元法是一种新的数值方法,将其用于薄板弯曲问题的边界积分方程,提出了薄板弯曲问题的边界无单元法.算例表明,该方法计算量小、精度高,具有更加广泛的工程应用前景.

分析各向异性板的各向同性化样条积分方程法

本文分别按Reissner理论和Kirchhoff理论导出各向导性板的各向同性化控制方程,并论证了它们间在正交各向异性简支矩形板中的相通性.在用样条积分方程法求解中采用的只是些简单的各向同性板基本解,在稀疏剖分下也能有良好的计算精度.对双参数弹性地基上的板也只需在板上虚载的取值上附加某些项而不致增加多大的工作量。

板弯曲问题的具两组高阶基本解序列的MRM方法

讨论了双参数地基上薄板弯曲问题· 利用两组高阶基本解序列,即调和及重调和基本解序列,采用多重替换方法(MRM方法)。

一类微分方程组的解法及其在圆板热弯曲问题求解中的应用

提出并证明了关于一类微分方程组基本解的积分法定理，阐述了定理的数学与物理意义。并以受激光辐照的圆板弯曲问题的求解作为该定理应用的实例。

两对边简支单向变刚度矩形板的弯曲问题

本文通过做未知函数变换，将两对边简支单向变刚度矩形板在任意横向分布载荷作用下的弯曲问题归结为求解第二类的Ｖｏｌｔｅｒｒａ积分方程。对上述积分方程，建议了二次样条函数的近似解法，求得了问题的渐近解析解。为了检验方法的有效性并说明其应用，对线性变厚度的情形做了数值计算，所得结果和精确解符合得很好。

圆板大挠度新的样条积分方程法

本文提出了圆板大挠度新的样条积分方程法。根据圆板大挠度问题的二个平衡方程及环基本解,导出了一组积分方程,再利用样条函数法进行求解。由于采用了样条插值,只要划分少量单元就能获得精度很高的数值解。本文成果与精确解良好吻合。

基于样条函数的薄壁曲线箱梁弯扭耦合分析

为了更加准确地分析薄壁曲线箱梁弯扭耦合问题,放弃了弯曲时的平截面假设和乌曼斯基对扭转时纵向翘曲位移的假定,在标准的三次样条函数基础上推导出了转换后的三次样条函数,利用该函数来模拟弯曲和扭转耦合情况下的纵向位移,考虑了弯曲时剪力滞后、剪切应变,以及翘曲剪应变的影响,并在弯曲和扭转应变能完全耦合的情况下进行了计算。建立了薄壁曲线梁弯扭耦合分析的哈密顿对偶求解体系,导出了哈密顿正则方程。哈密顿正则方程为一阶微分方程组,便于应用高精度的精细积分法来求解。本文将三次样条插值与精细积分相结合,形成了一种半离散半精细积分的新算法,从一定程度上完善了薄壁曲线箱梁的分析理论。将本文算法与相关文献计算结果进行对比,平均相对误差为4.45%,整体吻合良好。

一类微分方程组的积分解法及其在厚板热力弯曲中的应用

提出并证明了一类非齐次线性微分方程组的积分解法，并以求解受激光和横向力联合加载厚板的轴对称弯曲问题作为该方法的应用实例，籍此给出了考虑挤压效应、旋转惯性效应和剪切变形效应时厚板动态弯曲的扰度和转角公式· 结果表明运用该定理求解问题具有规范。

圆板弹塑性弯曲的简单样条积分方程法

提出了圆板弹塑性弯曲的简单样条积分方程法.以径向转角作为未知量建立积分方程并结合B样条函数进行求解.这一方法具有域积分容易处理、精度高和计算简单的优点.计算结果表明本文解与文[2]解吻合良好.