Unified Way for Dealing With Three-Dimensional Problems of Solid Elasticity

XU Qiang; SUN Huan-chun

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Article Navigation > Applied Mathematics and Mechanics > 2001 > 22(12): 1221-1229

XU Qiang, SUN Huan-chun. Unified Way for Dealing With Three-Dimensional Problems of Solid Elasticity[J]. Applied Mathematics and Mechanics, 2001, 22(12): 1221-1229.

Citation:

XU Qiang, SUN Huan-chun. Unified Way for Dealing With Three-Dimensional Problems of Solid Elasticity[J]. Applied Mathematics and Mechanics, 2001, 22(12): 1221-1229.

Citation:

XU Qiang, SUN Huan-chun. Unified Way for Dealing With Three-Dimensional Problems of Solid Elasticity[J]. Applied Mathematics and Mechanics, 2001, 22(12): 1221-1229.

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Unified Way for Dealing With Three-Dimensional Problems of Solid Elasticity

XU Qiang¹,
SUN Huan-chun²

1.
Department of Building Engineering, Tongji University, Shanghai 200092, P. R. China;
2.
Department of Engineering Mechanics, Dalian University of Technology, Dalian 116023, P. R. China

Received Date: 2000-07-27
Rev Recd Date: 2001-07-03
Publish Date: 2001-12-15

Abstract

Abstract

Unified way for dealing with the problemsal of three dimensional solid, each type of plates and shells etc. was presented with the virtual boundary element least squares method(VBEM). It proceeded from the differential equations of three-dimensional theory of elasticity and employs the Kelvin solution and the least squares method. It is advantageous to the establishment of the models of a software for general application to calculate each type of three-dimensional problems of elasticity. Owing to directly employing the Kelvin solution and not citing any hypothesis, the numerical results of the method should be better than any others. The merits of the method are highlighted in comparison with the direct formulation of boundary element method(BEM). It is shown that coefficient matrix is symmetric and the treatment of singular integration is rendered unnecessary in the presented method. The examples prove the efficiency and calculating precision of the method.
- virtual boundary element,
- least squares method,
- unified way of elasticity

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References(9)

References

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