异质棒材中的裂纹成核:相场模型的 h-FEM 和 p-FEM

IF 3.7 2区 工程技术 Q1 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
Maxime Levy, Francesco Vicentini, Zohar Yosibash
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引用次数: 0

摘要

对于异质材料(如功能分级材料和骨骼)的失效起始和随后的裂纹轨迹,研究还不够深入。本文在一维环境下对 AT1 相场模型(PFM)进行了研究,当采用 h 和 p 有限元(FE)方法进行离散时,既面临挑战,也面临机遇。考虑到异质 E(x) 和 \(G_{Ic}(x)\),我们推导出处于拉伸状态的异质棒材的显式 PFM 解,这对于验证 FE 近似值非常必要。为了解释峰值应力的低估,我们建议对 h-FEM 中损伤区域的元素尺寸进行 \(G_{Ic}(x)\) 修正,p-FEM 则不需要任何此类修正。我们还推导并验证了异质域的惩罚系数,以通过惩罚强制执行损伤的正向性和不可逆性。我们提供的数值示例表明,与经典的 h-FEM 相比,p-FEM 的收敛速度更快。这些新见解有助于在三维环境中对 p-FEM 进行离散化,从而准确预测人体骨骼的破坏起因。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Crack nucleation in heterogeneous bars: h- and p-FEM of a phase field model

Crack nucleation in heterogeneous bars: h- and p-FEM of a phase field model

Failure initiation and subsequent crack trajectory in heterogeneous materials, such as functionally graded materials and bones, are yet insufficiently addressed. The AT1 phase field model (PFM) is investigated herein in a 1D setting, imposing challenges and opportunities when discretized by h- and p-finite element (FE) methods. We derive explicit PFM solutions to a heterogeneous bar in tension considering heterogeneous E(x) and \(G_{Ic}(x)\), necessary for verification of the FE approximations. \(G_{Ic}(x)\) corrections accounting for the element size at the damage zone in h-FEMs are suggested to account for the peak stress underestimation. p-FEMs do not require any such corrections. We also derive and validate penalty coefficient for heterogeneous domains to enforce damage positivity and irreversibility via penalization. Numerical examples are provided, demonstrating that p-FEMs exhibit faster convergence rates comparing to classical h-FEMs. The new insights are encouraging towards p-FEM discretization in a 3D setting to allow an accurate prediction of failure initiation in human bones.

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来源期刊
Computational Mechanics
Computational Mechanics 物理-力学
CiteScore
7.80
自引率
12.20%
发文量
122
审稿时长
3.4 months
期刊介绍: The journal reports original research of scholarly value in computational engineering and sciences. It focuses on areas that involve and enrich the application of mechanics, mathematics and numerical methods. It covers new methods and computationally-challenging technologies. Areas covered include method development in solid, fluid mechanics and materials simulations with application to biomechanics and mechanics in medicine, multiphysics, fracture mechanics, multiscale mechanics, particle and meshfree methods. Additionally, manuscripts including simulation and method development of synthesis of material systems are encouraged. Manuscripts reporting results obtained with established methods, unless they involve challenging computations, and manuscripts that report computations using commercial software packages are not encouraged.
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