矩形板大挠度问题的样条函数解

本文以中心挠度为摄动参数,将矩形板大挠度问题的非线性偏微分方程缉转化为几个线性的偏微分方程组,然后分别用样条有限点法和样条有限元法求解,得到了在多种边界条件下具有任意长宽比的,受均布荷载的矩形板的解答,给出了板中面的位移、挠度的解析表达式;并编制了相关的计算机程序.计算的结果与现有的其他理论的结果作了比较,表明本文的结果是良好的.

弹塑性有限变形的广义Prandtl_Reuss本构方程和应力共旋率研究

本文通过一种新的途径研究弹塑性有限变形的广义Ｐｒａｎｄｔｌ＿Ｒｅｕｓ本构方程·研究表明对于广义Ｐｒａｎｄｔｌ＿Ｒｅｕｓ本构方程，变形率弹塑性和分解的假设并非必须·研究了采用物质共旋率的广义Ｐｒａｎｄｔｌ＿Ｒｅｕｓ本构方程，从理论上分析了简单剪切应力振荡的原因·提出一种用于构造广义Ｐｒａｎｄｔｌ＿Ｒｅｕｓ本构方程中应力和背应力共旋率的修正相对旋率·最后，对简单剪切变形进行应力计算·

地层在层面力作用下的褶皱失稳分析

本文对地质力学旋扭构造体系中的三类基本构造型式——雁行构造、旋卷构造和山字型构造,在地壳层面力引起的水平联合应力场作用下失稳而形成的褶皱进行了解析的和数值的分析,求解了直角坐标系和柱极坐标系中不同边界条件和应力组合方式下的地层失稳状态。文中叙述了地质问题的提出、数学力学模型和相应的基本微分方程。在求控制方程的解析解过程中,出现一类多自变量的非线性超越方程组,且其解不能用封闭型函数表达。这里介绍了求解这些非线性超越方程所采用的数值方法。最后简略介绍了计算雁行、旋卷和山字型褶皱的程序软件包 AWEPACK。

地壳位移场之三维有限元分析

考虑到地壳的三维不均一性,并使各地质构造单元的参数与实测值相近,本文采用三维有限元方法,计算了在重力和温度作用下的地壳位移场。计算得到的位移场具有全球分带的特点。这种分带与地球表面构造形迹吻合得较好。

由断层擦痕反演构造应力场的新进展

在简要回顾了由断层擦痕反演构造应力场的Angelier法之后.着重概述了Reches法的基本思路,指出该法考虑了库伦准则并巧妙地建立了以擦痕方向作为一坐标轴的坐标系,因而具有使求解的方程线性化等优越性,最后提到了王连捷等所采用的搜索法这一正演方法解决反演构造应力场问题的可取之处。

椭圆板的大挠度问题

本文在圆薄板大挠度问题摄动解法(1948).(1954)的基础上,求得了椭圆板大挠度问题的摄动解.本文的公式推导是1957年以前完成的,由于某些原因,长期未得发表.1959年见到Nash-Cooley以摘要形式发表的类似工作,但只有λ=a/b=2的数值结果.这里将原先推导的正确至二级近似的分析公式以及计算结果发表.其中包括泊桑比v=0.25,0.30,0.35,椭圆半径比λ=1,2,3.4.5的全部计算结果,以备工程设计计算之用.

确定古应力场的断层擦痕分析法力学原理

利用断层擦痕方向判断区域构造应力场是最近几年发展起来的一种方法。本文详细介绍了这种方法的历史发展、使用步骤和适用条件以及作为方法基础的力学原理。方法的主要点是从野外测量得到区域中诸断层面上的擦痕方向,并按 Bott 原则将这些方向视为当时将出现断层的那些截面上的剪应力的方向。根据这些实测数据,利用连续介质力学给出的区域应力与任一截面上剪应力之间的关系式,并采用数学中的最优化处理方法,可以求出区域应力场的三个主应力方向和一个主应力差的比值。若要确定三个主应力的大小,则尚须辅以其它方法定出一个应力差的值和各向等应力的值,此时方能具有足够的方程来全面确定所求的区域构造应力场。

应力椭球与应力椭圆

本文是为地质工作者和矿山工程师写的。文中介绍了应力椭球和应力椭圆、方向指示曲面和方向指示曲线的概念,以及在工程实践中正确使用它们的方法。特别说明:应力椭球和椭圆必须分别配合方向指示曲面和曲线才能够给出岩体内一点的应力状态的完整观念。文中还引用实例详细叙述了如何利用方向指示曲面或曲线,求应力椭球或椭圆矢径所代表的任一总应力所作用的岩体剖面的作图法。熟悉了这个作图法,那末,求岩体内任一剖面上应力分量的作图法将不言自明。

多夹层板壳的非线性理论及应用(Ⅰ)──基本理论

本文建立了多夹层壳体小应变状态下的中转动二阶大挠度的理论，接着进行适当的简化，获得了中转动、中小转动的一阶大挠度的理论．

多夹层板壳的非线性理论及应用(Ⅱ)──正交异性材料扁壳的基本方程

本文把文[1]建立的多夹层壳体的中小转动一阶大挠度理论，具体地运用到多夹层扁壳中去给出了正交异性材料的多夹层扁壳的大挠度问题平衡方程和边界条件及其特例，宏观各向同性材料多夹层扁壳的大挠度方程．

多夹层板壳的非线性理论及应用(Ⅲ)──扁壳的弯曲和稳定

本文根据文[1]获得的多夹层扁壳非线性基本方程，求解了各种载荷及边界条件下矩形底面多夹层扁壳的非线性弯曲问题，多夹层板、扁柱亮在轴向压力作用下的稳定问题，以及一般形状的扁壳在边界作用力下的变形．

接触预压式元件钻孔变形法地应力测量数值处理

在现有的采用接触预压式元件的钻孔变形法地应力测量中，不论是用哈斯特率定法还是围压率定法，在计算孔壁的折算位移时都存在着不足。１９８４年潘立宙首先指出了这些不足，并给出了计算孔壁折算位移的精确公式［１］。但由于公式中的某些参数不能直接获得，所以公式一时无法应用于实际测量。本文通过有限元法的数值计算，确定了文献［１］的计算公式中的参数值，从而得出了用以往方法计算折算位移所产生的误差。又经过数值的量级比较，明确了文献［１］的公式中所考虑的那些对计算折算位移有影响的因素的主次。

THE SOLUTION OF RECTANGULAR PLATES WITH LARGE DEFLECTION BY SPLINE FUNCTIONS

In this paper, Von Karman's set of nonlinear equations for rectangular plates with large deflection is divided into several sets of linear equations by perturbation method, the dimensionless center deflection being taken as a perturbation parameter. These sets of linear equations are solved by the spline finite-point (SFP) method and by the spline finite element (SFE) method. The solutions for rectangular plates having any length-to-width ratios under a uniformly distributed load and with various boundary conditions are presented, and the analytical formulas for displacements and deflections are given in the paper. The computer programs are worked out by ourselves. Comparison of the results with those in other papers indicates that the results of this paper are satisfactorily better.

STUDY ON THE GENERALIZED PRANDTL-REUSS CONSTITUTIVEEQUATION AND THE COROTATIONALRATES OF STRESS TENSOR

In this paper, the generalized Prandtl-Reuss (P-R) constitutive equations of elastic-plastic material in the presence of finite deformations through a new approach are studied. It analyzes the generalized P-R equation based on the material corotational rate and clarifies the puzzling problem of the simple shear stress oscillation mentioned in some literature. The paper proposes a modified relative rotational rate with which to constitute the objective rates of stress in the generalized P-R equation and concludes that the decomposition of total deformation rate into elastic and plastic parts is not necessary in developing the generalized P-R equations. Finally, the stresses of simple shear deformation are worked out.

NONLINEAR THEORY OF MULTILAYER SANDWICH SHELLS AND ITS APPLICATION(III)──LARGE DEFLECTION AND POSTBUCKLING OF SHALLOW SHELLS

In this paper, exact solutions of large deflection of multilayer sandwich shallow shellsunder transverse forces and different boundary conditions are presented. Exact results ofpostbuckling of multilayer sandwich plates, shallow cylindrical shells and nonlineardeflection of general shallow shells such as spherical shells under inplane edge forcesare also obtained by the same procedure.

NONLINEAR THEORY OF MULTILAYER SANDWICH SHELLS AND ITSAPPLICATION (Ⅱ)──FUNDAMENTAL EQUATIONS FOR ORTHOTROPIC SHALLOW SHELLS

This paper applied the simplified theory.for multilayer sandwich shells undergoingmoderate small rotations in Ref [1] to shallow shells. The equilibrium equations andboundary conditions of large deflction of orthotropic and the special case. isotropicshells, are presented.

LARGE DEFLECTION PROBLEM OF A CLAMPED ELLIPTICAL PLATE SUBJECTED TO UNIFORM PRESSURE

In this paper, the perturbation solution of large deflection problem of clampedelliptical plate subjected to uniform pressure is given on the basis of the perturbationsolution of large deflection problem of similar clamped circular plate (1948)[1], (1954)[2]. The analytical solution of this problem was obtained in 1957. However, due to social difficulties, these results have never been published. Nash and Cooley (1959)[3] published a brief note of similar nature, in which only the case λ=a/b=2 is given. In this paper, the analytical solution is given in detail up to the 2nd approximation. The numerical solutions are given for various Poisson ratios v =0.25, 0.30, 0.35 and for various eccentricities λ= 1, 2, 3, 4, 5, which can be used in the calculation of engineering designs.