用自然元素法建立脆性断裂的四阶相场模型

IF 2.2 3区 工程技术 Q3 MATERIALS SCIENCE, MULTIDISCIPLINARY
P. Aurojyoti, A. Rajagopal
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引用次数: 0

摘要

与断裂的二阶相场模型(PFM)相反,四阶相场模型通过在所谓的裂纹密度函数中加入相场阶参数的高阶导数(曲率)来更精确地表示裂纹表面。因此,在有限元设置中,相场控制微分方程的弱形式要求基函数具有 \(C^1\) 连续性。\(C^0\) Sibson 插值或自然元素插值是通过二阶 Voronoi 单元与一阶 Voronoi 单元所追踪的面积之比获得的,它基于节点点集的自然邻接。\(C^1\) Sibson 内插值是通过在立方体单纯形的伯恩斯坦-贝塞尔补丁中提升已评估的 \(C^0\) 内插值的程度而得到的。为了提高计算效率,同时只考虑驱动断裂的拉伸部分,采用了混合 PFM。在这项工作中,介绍了具有 \(C^1\) Sibson 插值的高阶 PFM 的数值实现以及一些基准示例,以展示这种方法在模拟脆性材料断裂方面的性能。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Fourth order phase field modeling of brittle fracture by Natural element method

Fourth order phase field modeling of brittle fracture by Natural element method

Contrary to the second-order Phase field model (PFM) of fracture, fourth-order PFM provides a more precise representation of the crack surface by incorporating higher-order derivatives (curvature) of the phase-field order parameter in the so-called crack density functional. As a result, in a finite element setting, the weak form of the phase-field governing differential equation requires \(C^1\) continuity in the basis function. \(C^0\) Sibson interpolants or Natural element interpolants are obtained by the ratio of area traced by the second-order Voronoi cell over the first-order Voronoi cells, which is based on the natural neighbor of a nodal point set. \(C^1\) Sibson interpolants are obtained by degree elevating the evaluated \(C^0\) interpolants in the Bernstein-Bezier patch of a cubic simplex. For better computational efficiency while accounting only for the tensile part for driving fracture, a hybrid PFM is adopted. In this work, the numerical implementation of higher-order PFM with \(C^1\) Sibson interpolants along with some benchmark examples are presented to showcase the performance of this method for simulating fracture in brittle materials.

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来源期刊
International Journal of Fracture
International Journal of Fracture 物理-材料科学:综合
CiteScore
4.80
自引率
8.00%
发文量
74
审稿时长
13.5 months
期刊介绍: The International Journal of Fracture is an outlet for original analytical, numerical and experimental contributions which provide improved understanding of the mechanisms of micro and macro fracture in all materials, and their engineering implications. The Journal is pleased to receive papers from engineers and scientists working in various aspects of fracture. Contributions emphasizing empirical correlations, unanalyzed experimental results or routine numerical computations, while representing important necessary aspects of certain fatigue, strength, and fracture analyses, will normally be discouraged; occasional review papers in these as well as other areas are welcomed. Innovative and in-depth engineering applications of fracture theory are also encouraged. In addition, the Journal welcomes, for rapid publication, Brief Notes in Fracture and Micromechanics which serve the Journal''s Objective. Brief Notes include: Brief presentation of a new idea, concept or method; new experimental observations or methods of significance; short notes of quality that do not amount to full length papers; discussion of previously published work in the Journal, and Brief Notes Errata.
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