Application of the Finite Part of a Divergent Integral in the Theory of Elasticity

Wang Min-zhong

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Wang Min-zhong. Application of the Finite Part of a Divergent Integral in the Theory of Elasticity[J]. Applied Mathematics and Mechanics, 1985, 6(12): 1071-1078.

Citation:

Wang Min-zhong. Application of the Finite Part of a Divergent Integral in the Theory of Elasticity[J]. Applied Mathematics and Mechanics, 1985, 6(12): 1071-1078.

Citation:

Wang Min-zhong. Application of the Finite Part of a Divergent Integral in the Theory of Elasticity[J]. Applied Mathematics and Mechanics, 1985, 6(12): 1071-1078.

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Application of the Finite Part of a Divergent Integral in the Theory of Elasticity

Wang Min-zhong

Department of Mechanics, Peking University, Beijing

Received Date: 1984-09-19
Publish Date: 1985-12-15

Abstract

Abstract

Using the finite part of a divergent integral, we transform Kelvin's solutions, Boussinesq's solutions and Mindlin's solutions in the three-dimensional theory of elasticity into corresponding solutions in the two-dimensional theory. Besides, its application in plane problems is also given.

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References(11)

References

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