Identifying Second-Gradient Continuum Models in Particle-Based Materials with Pairwise Interactions Using Acoustic Tensor Methodology

IF 1.8 3区 工程技术 Q2 ENGINEERING, MULTIDISCIPLINARY Journal of Elasticity Pub Date : 2024-04-04 DOI:10.1007/s10659-024-10067-8
Gabriele La Valle, Christian Soize
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引用次数: 0

Abstract

This paper discusses wave propagation in unbounded particle-based materials described by a second-gradient continuum model, recently introduced by the authors, to provide an identification technique. The term particle-based materials denotes materials modeled as assemblies of particles, disregarding typical granular material properties such as contact topology, granulometry, grain sizes, and shapes. This work introduces a center-symmetric second-gradient continuum resulting from pairwise interactions. The corresponding Euler-Lagrange equations (equilibrium equations) are derived using the least action principle. This approach unveils non-classical interactions within subdomains. A novel, symmetric, and positive-definite acoustic tensor is constructed, allowing for an exploration of wave propagation through perturbation techniques. The properties of this acoustic tensor enable the extension of an identification procedure from Cauchy (classical) elasticity to the proposed second-gradient continuum model. Potential applications concern polymers, composite materials, and liquid crystals.

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利用声张量方法识别具有成对相互作用的粒子材料中的第二梯度连续模型
本文讨论了由作者最近引入的第二梯度连续模型描述的无界颗粒基材料中的波传播,以提供一种识别技术。所谓颗粒基材料,是指不考虑接触拓扑、粒度、晶粒大小和形状等典型颗粒材料特性,以颗粒集合体为模型的材料。这项研究引入了由成对相互作用产生的中心对称第二梯度连续体。利用最小作用原理推导出相应的欧拉-拉格朗日方程(平衡方程)。这种方法揭示了子域内的非经典相互作用。构建了一个新颖、对称和正有限的声学张量,允许通过扰动技术探索波的传播。这种声学张量的特性使得从考希式(经典)弹性到拟议的第二梯度连续模型的识别程序得以扩展。潜在应用涉及聚合物、复合材料和液晶。
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来源期刊
Journal of Elasticity
Journal of Elasticity 工程技术-材料科学:综合
CiteScore
3.70
自引率
15.00%
发文量
74
审稿时长
>12 weeks
期刊介绍: The Journal of Elasticity was founded in 1971 by Marvin Stippes (1922-1979), with its main purpose being to report original and significant discoveries in elasticity. The Journal has broadened in scope over the years to include original contributions in the physical and mathematical science of solids. The areas of rational mechanics, mechanics of materials, including theories of soft materials, biomechanics, and engineering sciences that contribute to fundamental advancements in understanding and predicting the complex behavior of solids are particularly welcomed. The role of elasticity in all such behavior is well recognized and reporting significant discoveries in elasticity remains important to the Journal, as is its relation to thermal and mass transport, electromagnetism, and chemical reactions. Fundamental research that applies the concepts of physics and elements of applied mathematical science is of particular interest. Original research contributions will appear as either full research papers or research notes. Well-documented historical essays and reviews also are welcomed. Materials that will prove effective in teaching will appear as classroom notes. Computational and/or experimental investigations that emphasize relationships to the modeling of the novel physical behavior of solids at all scales are of interest. Guidance principles for content are to be found in the current interests of the Editorial Board.
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