Tension of an Infinite Body Containing a Row of Ellipsoidal Inclusions.

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Bibliographic Information

Other Title
  • 任意個の回転だ円体状介在物を持つ無限体の引張り
  • ニンイコ ノ カイテン ダエンタイジョウ カイザイブツ オ モツ ムゲンタイ
Published
1996
Resource Type
journal article
DOI
  • 10.1299/kikaia.62.1226
Publisher
The Japan Society of Mechanical Engineers

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Description

This paper deals with a row of equally spaced equal ellipsoidal inclusions in an infinite body subjected to tension. Based on the concepts of the body force method, the problems are formulated as a system of singular integral equations with cauchy-type or logarithmic-type singularities, where the densities of body forces distributed in the γ and z-directions of infinite bodies having the same elastic constants of the matrix and inclusions are unknown functions. In order to satisfy the boundary conditions along the inclusions, eight kinds of fundamental density functions proposed in our previous paper are used. In the analysis, the number, shape and distance of inclusions are varied systematically; then, the magnitude and position of the maximum stress are examined. For any fixed shape and size of inclusions, the maximum stress is shown to be linear with the reciprocal of the squared number of inclusions.

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