概率测度的变分原理和哈申-施特里克曼边界

IF 5.7 1区 工程技术 Q1 ENGINEERING, MULTIDISCIPLINARY
Victor L. Berdichevsky, Md-Tofiqul Islam
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引用次数: 0

摘要

本文从概率量纲的变分原理角度出发,对多晶体和复合材料的有效传导模量和弹性模量的 Hashin-Shtrikman 类型界值进行了综述。这些界限的结果是用概率术语重新得出的。值得注意的是,在概率方面,哈申-施特里克曼方法的形式特别简单。此外,在基本假设、试验场的选择和简化假设(如几何各向同性、物理各向同性、纹理各向同性等)之间出现了明显的区别。我们填补了几个空白。首先,我们推导出了一个积分方程,当简化假设不成立时,可以通过求解得到边界。其次,我们将晶体立方对称的多晶体的界限扩展到所有热力学上可能存在的晶体;以前,这种界限是针对具有特殊弹性特性的晶体发现的。考虑的一个实际结果是推导出有效弹性模量随温度变化的近似公式。第三,对于具有非立方对称性的晶体,我们提出了代数变分问题,通过数值求解来获得边界,并解决了几种材料的这些问题。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
The variational principle for probabilistic measure and Hashin–Shtrikman bounds

The paper is a review of Hashin–Shtrikman type bounds for effective moduli of conductivity and elasticity of polycrystals and composites written from the perspective of the variational principle for probabilistic measure. The results for such bounds are rederived in probabilistic terms. Remarkably, in probabilistic terms the Hashin–Shtrikman approach gets especially simple form. Besides, a clear distinction arises between the basic assumption, the choice of the trial field, and the simplifying assumptions, like geometrical isotropy, physical isotropy, texture isotropy, etc. We filled out several gaps. First, we derive an integral equation to be solved to get the bounds when the simplifying assumptions do not hold. Second, we extend the bounds for polycrystals with the cubic symmetry of crystallites to all thermodynamically possible crystallites; previously such bounds were found for crystallites with special elastic properties. One practical outcome considered is the derivation of approximate formulae for the temperature dependence of effective elastic moduli. Third, for crystallites with non-cubic symmetries, we formulated algebraic variational problems to be solved numerically to obtain the bounds, and solved these problems for several materials.

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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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