COUPLING EFFECTS OF VOID SHAPE AND VOID SIZE ON THE GROWTH OF AN ELLIPTIC VOID IN A FIBER-REINFORCED HYPER-ELASTIC THIN PLATE

COUPLING EFFECTS OF VOID SHAPE AND VOID SIZE ON THE GROWTH OF AN ELLIPTIC VOID IN A FIBER-REINFORCED HYPER-ELASTIC THIN PLATE

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摘要 The growth of a prolate or oblate elliptic micro-void in a fiber reinforced anisotropic incompressible hyper-elastic rectangular thin plate subjected to uniaxial extensions is studied within the framework of finite elasticity. Coupling effects of void shape and void size on the growth of the void are paid special attention to. The deformation function of the plate with an isolated elliptic void is given, which is expressed by two parameters to solve the differential equation. The solution is approximately obtained from the minimum potential energy principle. Deformation curves for the void with a wide range of void aspect ratios and the stress distributions on the surface of the void have been obtained by numerical computation. The growth behavior of the void and the characteristics of stress distributions on the surface of the void are captured. The combined effects of void size and void shape on the growth of the void in the thin plate are discussed. The maximum stresses for the void with different sizes and different void aspect ratios are compared. The growth of a prolate or oblate elliptic micro-void in a fiber reinforced anisotropic incompressible hyper-elastic rectangular thin plate subjected to uniaxial extensions is studied within the framework of finite elasticity. Coupling effects of void shape and void size on the growth of the void are paid special attention to. The deformation function of the plate with an isolated elliptic void is given, which is expressed by two parameters to solve the differential equation. The solution is approximately obtained from the minimum potential energy principle. Deformation curves for the void with a wide range of void aspect ratios and the stress distributions on the surface of the void have been obtained by numerical computation. The growth behavior of the void and the characteristics of stress distributions on the surface of the void are captured. The combined effects of void size and void shape on the growth of the void in the thin plate are discussed. The maximum stresses for the void with different sizes and different void aspect ratios are compared.

作者 Jiusheng Ren Hanhai Li Changjun Cheng Xuegang Yuan

机构地区 Department of Mechanics Shanghai Key Laboratory of Mechanics in Energy and Environment Engineering College of Science

出处《Acta Mechanica Solida Sinica》 SCIE EI 2012年第3期312-320,共9页 固体力学学报（英文版）

基金 supported by the National Natural Science Foundation of China (Nos. 10772104 and 10872045) the Innovation Project of Shanghai Municipal Education Commission (No. 09YZ12) the Shanghai Leading Academic Discipline Project (No. S30106)

关键词 fiber reinforced hyper-elastic material rectangular thin plate with void void shapeand void size potential energy principle growth of void fiber reinforced hyper-elastic material, rectangular thin plate with void, void shapeand void size, potential energy principle, growth of void

分类号 O343.1 [理学—固体力学] TG113.251 [金属学及工艺—物理冶金]

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参考文献2

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Acta Mechanica Solida Sinica

2012年第3期

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COUPLING EFFECTS OF VOID SHAPE AND VOID SIZE ON THE GROWTH OF AN ELLIPTIC VOID IN A FIBER-REINFORCED HYPER-ELASTIC THIN PLATE

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