Generalization of Elliott's Solution to Transversely Isotropic Elasticity Problems in Cartesian Coordinates
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概要
- 論文の詳細を見る
A generalized Elliott solution to transversely isotropic elasticity problems is proposed in Cartesian coordinates. The solution consists of five potential functions and includes some new solutions corresponding to equal roots of a quadratic equation composed of four elastic constants. The solution is reduced to Elliott's solution when three potential functions in the solution are omitted. When elastic constants of transversely isotropic soilds are replaced with those of isotropic solids, the solution is exactly coincident with the modified form of the generalized Boussinesq solution to isotropic solids.
- 一般社団法人日本機械学会の論文
- 1989-07-15
著者
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Dohba Hisanori
Department Of Mechanical Engineering Kitami Institute Of Technology
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Dohba Hisanori
Department Of Mechanical Engineering Kitami Insti-tute Of Technology
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A.OKUMURA Isamu
Department of Civil Engineering, Kitami Institute of Technology
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A.okumura Isamu
Department Of Civil Engineering Kitami Institute Of Technology
関連論文
- Bending of a Transversely Isotropic,Rectangular Thick Plate with Free Edges
- Generalization of Elliott's Solution to Transversely Isotropic Elasticity Problems in Cartesian Coordinates
- Solutions to States of Plane Stress and Generalized Plane Stress in Transversely Isotropic, Rectangular Thick Plates and Their Applications