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双材料应力分析中的镜像点方法

MIRROR POINT METHOD FOR STRESS ANALYSIS OF BONDED DISSIMILAR MATERIALS

  • 摘要: 提出一种分析各类双材料中任一点受集中力作用问题的方法. 通过将结合界面或其自由表面看作镜面,将应力函数或位移函数设定成固定于受载点及其镜像点上的局部坐标系下的形式,利用界面连续条件和Dirichlet的单值性原理,所有应力函数或位移函数就可由无限体中集中力的解或半无限体表面集中力的解的应力函数求得. 这种方法不仅可适用于单一界面的情况,也可使用于多个界面并存的情况,并且也可适用于具有自由表面的结合材料.这一方法可应用于各类结合材料、涂层薄膜材料、板材等.

     

    Abstract: To analyze the fundamental solution of bonded dissimilar material structures, this paperhas proposed an effective theoretical analysis method, based on the Dirichlet's uniquenesstheorem and the mirror point technology. This method can be used to solve the problems ofconcentrated forces acting at the inside or at the free surface of infinite bonded dissimilar materials,by regarding the interface and the free surface as the reflection planes to the loading point. Byintroducing the mirror points, it is found that the whole stress function can be given as thesummation of that defined under the local coordinate system fixed to each mirror point. From theinterfacial condition of continuity and the free boundary condition, by adopting the Dirichlet'suniqueness theorem, then all the stress functions can be determined from that for concentratedforces acting at the inside of a infinite homogeneous media or at the free surface of a semi-infinitespace. Therefore, the corresponding theoretical solution can be deduced in the closed series formof stress functions corresponding to each mirror point. If there are infinite mirror points, it is foundthat only the stress functions corresponding to the first several mirror points have effects on theaccuracy of the solution, by the comparison of numerical and theoretical results. Such a theoreticalsolution can be used as the Green function to deal with the problem of distributed force, and alsoas the fundamental solution for boundary element method, so that it has extensive applications inengineering. Though the proposed method has been illustrated by only two examples of planeproblem in this paper, it can also be used to deal with three dimensional problems. Moreover, thismethod can be applied not only for the case of single reflection plane, but also for the case ofmultiple reflection planes, which generally leads to infinite mirror points, due to the reflectionafter reflection.

     

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