论Mindlin的各向同性应变梯度弹性:格林张量、正则化和算子分裂

M. Lazar, G. Po
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引用次数: 16

摘要

综述了Mindlin各向同性应变梯度弹性的II型理论。导出了无界介质的三维和二维格林张量及其一阶和二阶导数。利用Mindlin应变梯度弹性中的算子分裂,计算了三维和二维正则化函数张量,即张量亥姆霍兹方程的三维和二维格林张量。此外,引入了一个长度尺度张量,它负责应变梯度弹性的特征材料长度。此外,基于Mindlin应变梯度弹性的Green张量,研究了点力、线力和二重力。
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On Mindlin’s isotropic strain gradient elasticity: Green tensors, regularization, and operator-split
The theory of Mindlin’s isotropic strain gradient elasticity of form II is reviewed. Three-dimensional and two-dimensional Green tensors and their first and second derivatives are derived for an unbounded medium. Using an operator-split in Mindlin’s strain gradient elasticity, three-dimensional and two-dimensional regularization function tensors are computed, which are the three-dimensional and two-dimensional Green tensors of a tensorial Helmholtz equation. In addition, a length scale tensor is introduced, which is responsible for the characteristic material lengths of strain gradient elasticity. Moreover, based on the Green tensors of Mindlin’s strain gradient elasticity, point, line and double forces are studied.
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来源期刊
Journal of Micromechanics and Molecular Physics
Journal of Micromechanics and Molecular Physics Materials Science-Polymers and Plastics
CiteScore
3.30
自引率
0.00%
发文量
27
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