Analysis of In-Plane Problems for an Isotropic Elastic Medium with Many Circular Elastic Inclusions
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概要
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This paper presents general solutions for problems involving many circular elastic inclusions that are perfectly bonded to an elastic medium(matrix) of infinite extent under in-plane deformation. These many elastic inclusions may have different radii, central points and possess different elastic properties. The matrix is assumed to be subjected to arbitrary loading, for example, by uniform stresses at infinity. The solutions were obtained through iterations of theMöbius transformation as series with an explicit general term involving the complex potential functions of the corresponding homogeneous problem. This procedure is referred to as heterogenization. Using these solutions, several numerical examples are presented graphically.
- 一般社団法人 日本機械学会の論文
著者
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SUZUKI Takuo
Dept. Biol. Sci., Fac. Biosci. Biotechnol., Tokyo Inst. Technol.
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MIYAGAWA Mutsumi
Dept. of Creative Manufacturing Tokyo Metropolitan College of Industrial Technology. Arakawa Campus
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SUZUKI Takuo
Dept. of Creative Manufacturing Tokyo Metropolitan College of Industrial Technology. Arakawa Campus
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TAMIYA Takanobu
Dept. of Creative Manufacturing Tokyo Metropolitan College of Industrial Technology. Arakawa Campus
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SHIMURA Jyo
Tokyo National College of Technology
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