基于均质化应变能密度的新高阶变形理论和求解程序

IF 5.7 1区 工程技术 Q1 ENGINEERING, MULTIDISCIPLINARY International Journal of Engineering Science Pub Date : 2023-12-20 DOI:10.1016/j.ijengsci.2023.103990
Cao Yuheng, Zhang Chunyu, Wang Biao
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引用次数: 0

摘要

经典连续介质力学在解决涉及高度不均匀变形的问题时面临困难。所提出的理论研究了高阶微观变形对材料行为建模的影响,并通过均质化应变能密度对应变梯度进行了精细解释。所提出的理论只需要一个尺度参数,即代表体积元素(RVE)的大小。通过采用变分法和增量拉格朗日法 (ALM),得出了变形控制方程和数值求解程序。结果表明,均质化能量理论为经典理论尚未解决的问题(如变形的尺寸效应)提供了可信的解释和合理的预测。事实证明,均质化应变能的概念更适合描述材料复杂的力学行为。通过引入补充变量来降低方程的最高阶,ALM 可以有效地求解高阶偏微分方程。
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A New High-order Deformation Theory and Solution Procedure Based on Homogenized Strain Energy Density

The classical continuum mechanics faces difficulties in solving problems involving highly inhomogeneous deformations. The proposed theory investigates the impact of higher-order microscopic deformation on modeling of material behaviors and provides a refined interpretation of strain gradients through the homogenized strain energy density. Only one scale parameter, i.e., the size of the Representative Volume Element (RVE), is required by the proposed theory. By employing the variational approach and the Augmented Lagrangian Method (ALM), the governing equations for deformation as well as the numerical solution procedure are derived. It is demonstrated that the homogenized energy theory offers plausible explanations and reasonable predictions for the problems yet unsolved by the classical theory such as the size effect of deformation. The concept of homogenized strain energy proves to be more suitable for describing the intricate mechanical behavior of materials. And higher order partial differential equations can be effectively solved by the ALM by introducing supplementary variables to lower the highest order of the equations.

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来源期刊
International Journal of Engineering Science
International Journal of Engineering Science 工程技术-工程:综合
CiteScore
11.80
自引率
16.70%
发文量
86
审稿时长
45 days
期刊介绍: The International Journal of Engineering Science is not limited to a specific aspect of science and engineering but is instead devoted to a wide range of subfields in the engineering sciences. While it encourages a broad spectrum of contribution in the engineering sciences, its core interest lies in issues concerning material modeling and response. Articles of interdisciplinary nature are particularly welcome. The primary goal of the new editors is to maintain high quality of publications. There will be a commitment to expediting the time taken for the publication of the papers. The articles that are sent for reviews will have names of the authors deleted with a view towards enhancing the objectivity and fairness of the review process. Articles that are devoted to the purely mathematical aspects without a discussion of the physical implications of the results or the consideration of specific examples are discouraged. Articles concerning material science should not be limited merely to a description and recording of observations but should contain theoretical or quantitative discussion of the results.
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