Affiliation:
1. National Institute of Technology
2. Nagasaki University
Abstract
Based on the principle of a Body Force Method (BFM), any inclusion problem can besolved only by using a Kelvin solution which corresponds to a stress field caused by a point forceacting in a homogeneous infinite plate, regardless of the mechanical properties of the inclusion. Thischaracteristic is true even for an anisotropic inclusion in which the number of independent elasticconstants are larger than that of a homogeneous material. In the present study, some problems among anisotropic inclusions were analyzed numerically to demonstrate the validity.
Publisher
Trans Tech Publications, Ltd.
Subject
Mechanical Engineering,Mechanics of Materials,General Materials Science
Reference4 articles.
1. H. Nisitani: Journal of the Japan Society of Mechanical Engineers, 70-580 (1967), p.627 (in Japanese).
2. Chen, D. H. and Nisitani, H.: Journal of the Japan Society of Mechanical Engineers, Ser. A, 51- 462, p.571 (1985) (in Japanese).
3. Takuichiro Ino, Shohei Ueno and Akihide Saimoto: Key Engineering Materials(Trans Tech Publications, Switzerland 2014).
4. Chen, D. H. and Haruyama, S.: Journal of the Japan Society of Mechanical Engineers, Ser. A, 59-560, p.21 (1993) (in Japanese).
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