A review of inverse problems for generalized elastic media: formulations, experiments, synthesis

IF 1.9 4区 工程技术 Q3 MECHANICS
Roberto Fedele, Luca Placidi, Francesco Fabbrocino
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引用次数: 0

Abstract

Starting from the seminal works of Toupin, Mindlin and Germain, a wide class of generalized elastic models have been proposed via the principle of virtual work, by postulating expressions of the elastic energy enriched by additional kinematic descriptors or by higher gradients of the placement. More recently, such models have been adopted to describe phenomena which are not consistent with the Cauchy-Born continuum, namely the size dependence of apparent elastic moduli observed for micro and nano-objects, wave dispersion, optical modes and band gaps in the dynamics of heterogeneous media. For those structures the mechanical response is affected by surface effects which are predominant with respect to the bulk, and the scale of the external actions interferes with the characteristic size of the heterogeneities. Generalized continua are very often referred to as media with microstructure although a rigorous deduction is lacking between the specific microstructural features and the constitutive equations. While in the forward modelling predictions of the observations are provided, the actual observations at multiple scales can be used inversely to integrate some lack of information about the model. In this review paper, generalized continua are investigated from the standpoint of inverse problems, focusing onto three topics, tightly connected and located at the border between multiscale modelling and the experimental assessment, namely: (i) parameter identification of generalized elastic models, including asymptotic methods and homogenization strategies; (ii) design of non-conventional tests, possibly integrated with full field measurements and advanced modelling; (iii) the synthesis of meta-materials, namely the identification of the microstructures which fit a target behaviour at the macroscale. The scientific literature on generalized elastic media, with the focus on the higher gradient models, is fathomed in search of questions and methods which are typical of inverse problems theory and issues related to parameter estimation, providing hints and perspectives for future research.

广义弹性介质逆问题综述:公式、实验、综合
从图平、明德林和热尔曼的开创性著作开始,人们通过虚功原理,提出了多种广义弹性模型,即通过附加运动描述符或更高的位置梯度来丰富弹性能量的表达式。最近,这些模型被用来描述与考奇-伯恩连续统不一致的现象,即微观和纳米物体表观弹性模量的尺寸依赖性、波色散、异质介质动力学中的光学模式和带隙。对这些结构而言,机械响应受表面效应的影响,而表面效应相对于主体效应而言占主导地位,外部作用的尺度与异质性的特征尺寸相互干扰。广义连续体通常被称为具有微观结构的介质,尽管在具体的微观结构特征和构成方程之间缺乏严格的推导。虽然在正向建模中提供了对观测结果的预测,但多个尺度的实际观测结果可以反向用于整合模型中缺乏的一些信息。在这篇综述论文中,从逆向问题的角度对广义连续体进行了研究,重点关注三个紧密相连且位于多尺度建模和实验评估之间的主题,即:(i) 广义弹性模型的参数识别,包括渐近方法和均质化策略;(ii) 非常规试验的设计,可能与全面现场测量和高级建模相结合;(iii) 元材料的合成,即识别符合宏观尺度目标行为的微观结构。关于广义弹性介质的科学文献,以高梯度模型为重点,探究了反问题理论的典型问题和方法,以及与参数估计相关的问题,为未来研究提供了提示和展望。
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来源期刊
CiteScore
5.30
自引率
15.40%
发文量
92
审稿时长
>12 weeks
期刊介绍: This interdisciplinary journal provides a forum for presenting new ideas in continuum and quasi-continuum modeling of systems with a large number of degrees of freedom and sufficient complexity to require thermodynamic closure. Major emphasis is placed on papers attempting to bridge the gap between discrete and continuum approaches as well as micro- and macro-scales, by means of homogenization, statistical averaging and other mathematical tools aimed at the judicial elimination of small time and length scales. The journal is particularly interested in contributions focusing on a simultaneous description of complex systems at several disparate scales. Papers presenting and explaining new experimental findings are highly encouraged. The journal welcomes numerical studies aimed at understanding the physical nature of the phenomena. Potential subjects range from boiling and turbulence to plasticity and earthquakes. Studies of fluids and solids with nonlinear and non-local interactions, multiple fields and multi-scale responses, nontrivial dissipative properties and complex dynamics are expected to have a strong presence in the pages of the journal. An incomplete list of featured topics includes: active solids and liquids, nano-scale effects and molecular structure of materials, singularities in fluid and solid mechanics, polymers, elastomers and liquid crystals, rheology, cavitation and fracture, hysteresis and friction, mechanics of solid and liquid phase transformations, composite, porous and granular media, scaling in statics and dynamics, large scale processes and geomechanics, stochastic aspects of mechanics. The journal would also like to attract papers addressing the very foundations of thermodynamics and kinetics of continuum processes. Of special interest are contributions to the emerging areas of biophysics and biomechanics of cells, bones and tissues leading to new continuum and thermodynamical models.
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