任意泊松比材料的线性周流体力学模型的再推导和数学分析

Shangyuan Zhang, Yufeng Nie
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引用次数: 0

摘要

本文关注任意泊松比材料的线性周向动力学模型的建模和数学分析。在动力学基本定律的基础上,我们通过放宽某些假设,重新推导了各向异性材料的基于键的周动力学模型。通过这一过程,我们得出了一些重要结论,如等效应变能密度假设与周动态算子收敛于经典纳维算子之间的关系。此外,我们还建立了与时间相关的周动态运动方程的好拟性。最后,给出了各向异性材料稳定性的一些必要条件。
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Re‐derivation and mathematical analysis for linear peridynamics model for arbitrary Poisson ratio's material
This paper is concerned with the modeling and mathematical analysis of linear peridynamic model for arbitrary Poisson ratio's material. Based on the fundamental laws of dynamics, we re‐derive the bond‐based peridynamic model for anisotropic materials by relaxing certain assumptions. Through this process, we draw several significant conclusions, such as the relationship between the equivalent strain energy density hypothesis and the convergence of the peridynamic operator to the classical Navier operator. Additionally, the well‐posedness of time‐dependent peridynamic equations of motion is established. Finally, some necessary conditions for the material stability of anisotropic material are given.
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