求解Gurtin-Murdoch材料表面反平面问题的简单有限元算法

IF 3.5 3区工程技术 Q1 MATHEMATICS, APPLIED

Finite Elements in Analysis and Design Pub Date : 2025-02-26 DOI:10.1016/j.finel.2025.104318

María A. Herrera-Garrido , Sofia G. Mogilevskaya , Vladislav Mantič

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引用次数: 0

摘要

有限元算法的发展是为了解决涉及弹性域的反平面问题，这些弹性域的边界或其部分被薄而相对坚硬的层覆盖。这些层是通过消失厚度的Gurtin-Murdoch材料表面来建模的，这些表面可以是开放的或关闭的，也可以是光滑的或不光滑的。利用变分参数导出了问题的控制方程。采用三角有限元对区域进行离散化。一般来说，用标准线性元来近似域内的位移。然而，为了捕捉开放Gurtin-Murdoch表面尖端附近弹性场的奇异行为，设计了一种新的混合奇异元素。数值算例验证了该算法的准确性和鲁棒性。

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Simple finite element algorithm for solving antiplane problems with Gurtin–Murdoch material surfaces

The finite element algorithm is developed to solve antiplane problems involving elastic domains whose boundaries or their parts are coated with thin and relatively stiff layers. These layers are modeled by the vanishing thickness Gurtin–Murdoch material surfaces that could be open or closed, and smooth or non-smooth. The governing equations for the problems are derived using variational arguments. The domains are discretized using triangular finite elements. In general, standard linear elements are used to approximate displacements in the domain. However, to capture the singular behavior of the elastic fields near the tips of the open Gurtin–Murdoch surfaces, a novel blended singular element is devised. Numerical examples are presented to demonstrate the accuracy and robustness of the algorithm developed.

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来源期刊

Finite Elements in Analysis and Design 工程技术-力学

CiteScore

4.80

自引率

3.20%

发文量

审稿时长

27 days

期刊介绍： The aim of this journal is to provide ideas and information involving the use of the finite element method and its variants, both in scientific inquiry and in professional practice. The scope is intentionally broad, encompassing use of the finite element method in engineering as well as the pure and applied sciences. The emphasis of the journal will be the development and use of numerical procedures to solve practical problems, although contributions relating to the mathematical and theoretical foundations and computer implementation of numerical methods are likewise welcomed. Review articles presenting unbiased and comprehensive reviews of state-of-the-art topics will also be accommodated.