Based on the basic equations of the elastic plane problem, displacement fields and singular stress fields near the interfacial edge of bonded materials are obtained.
基于弹性力学平面问题的基本方程,推导了结合材料界面端附近的位移场和奇异应力场。
The fundamental equations in finite element method for unsteady temperature field elastic plane problem are derived on the bases of variational principle of coupled thermoelastic problems.
在耦合热弹性问题变分原理的基础上,导出非定常温度场热弹性平面问题的有限元法基本方程。
The complex variable method analytic solution of stress is given for the plane elastic stress problem of surrounding rock of shallow circular tunnel under ground load.
采用复变函数解法,研究地面荷载作用下浅埋圆形隧道围岩的平面弹性应力问题。
In the fifth chapter, the plane elastic problem of circular-arc rigid line inclusions is considered, which is subjected to remote general loads and.
第五章研究了在集中力与无穷远均匀拉伸作用下含界面刚性线圆形夹杂平面弹性问题。
The problem of an elastic plane having symmetric parabolic crack is discussed.
研究含轴对称抛物线曲裂纹平面弹性问题。
The retaining wall for remaining stability of slope are all designed as plane strain problem in elastic theory.
维护边坡稳定的挡土墙设计,都是按弹性力学平面应变问题分析的。
The plane elastic problem of circular-arc rigid line inclusions is considered.
圆弧形刚性线夹杂的平面弹性问题的考虑。
This paper deals with the plane strain problem of non-straight boundary semi infinite elastic solid to which a concentrated force is applied at the midpoint of the bottom of a groove.
本文对几种不同形状之刻槽的折线界面的半无限弹性体,在其槽底施以集中力的平面应变问题做了讨论。
On the basis of this solution, a complete solution for the anti-plane elastic dynamical problem with an arbitrary index of self-similarity in the orthotropic body is given.
基于这个解,文中导出了具有任意自相似指数的正交异性体反平面弹性动力学问题的一般解。
A fundamental solution for the problem of elastic semi-plane has been derived systematically.
文中系统地导出了弹性半平面问题的基本解。
By using the equations, a time-varying problem of up-growing rectangular plane considering the gravity is solved. Moreover the elastic and viscoelastic analytical results are obtained.
并依据此方程求得了一个时变力学问题——自重作用下矩形平面向上增长粘弹性时变力学解。
By using the equations, a time-varying problem of up-growing rectangular plane considering the gravity is solved. Moreover the elastic and viscoelastic analytical results are obtained.
并依据此方程求得了一个时变力学问题——自重作用下矩形平面向上增长粘弹性时变力学解。
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