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Rotation is antisymmetric and therefore is not a coherent element of the classical elastic theory, which is characterized by symmetry. A new theory of linear elasticity is developed from the concept of asymmetric strain, which is defined as the transpose of the deformation gradient tensor to involve rotation as well as symmetric strain. The new theory basically differs from the prevailing micropolar theory or couple stress theory in that it maintains the same basis as the classical theory of linear elasticity and does not need extra concepts, such as “microrotation” and “couple stresses”. The constitutive relation of the new theory, the three-parameter Hooke’s law, comes from the theorem about isotropic asymmetric linear elastic materials. Concise differential equations of translational motion are derived consequently giving the same velocity formula for P-wave and a different one for S-wave. Differential equations of rotational motion are derived with the introduction of spin, which has an intrinsic connection with rotation. According to the new theory, S-wave essentially has rotation as large as deviatoric strain and should be referred to as “shear wave” in the context of asymmetric strain. There are nine partial differential equations for the deformation harmony condition in the new theory;these are given with the first spatial differentiations of asymmetric strain. Formulas for rotation energy, in addition to those for (symmetric) strain energy, are derived to form a complete set of formulas for the total mechanical energy.
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篇名 A Simple Theory of Asymmetric Linear Elasticity
来源期刊 力学国际期刊(英文) 学科 数学
关键词 Linear Elasticity Asymmetric Linear Elasticity Asymmetric Strain Asymmetric Stress Three-Parameter Hooke’s Law
年,卷(期) 2020,(10) 所属期刊栏目
研究方向 页码范围 166-185
页数 20页 分类号 O17
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Linear
Elasticity
Asymmetric
Linear
Elasticity
Asymmetric
Strain
Asymmetric
Stress
Three-Parameter
Hooke’s
Law
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力学国际期刊(英文)
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2160-049X
武汉市江夏区汤逊湖北路38号光谷总部空间
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280
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0
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