用于二维动态裂纹分析的广义有限差分法

IF 1.4 Q2 MATHEMATICS, APPLIED
Bingrui Ju , Boyang Yu , Zhiyuan Zhou
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引用次数: 0

摘要

本文提出了一种利用广义有限差分法(GFDM)对瞬态弹性力学裂缝进行高效、精确分析的新框架。该方法首先将求解域离散为一组重叠的小子域,然后在每个子域中使用局部泰勒级数展开和移动最小平方逼近法逼近未知函数及其导数。在裂纹尖端附近区域,局部子域中使用的泰勒级数会自动增加,以适当描述近尖端位移和应力场的局部渐近行为。采用与路径无关的 J 积分和子域技术来计算开裂体的动态应力强度因子(SIF)。给出了均匀和可变加载条件下动态 SIF 的初步数值实验,以显示本方法在瞬态弹性力学裂纹分析中的高效性和准确性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
A generalized finite difference method for 2D dynamic crack analysis

This paper presents a new framework for efficient and accurate analysis of transient elastodynamic cracks by using the generalized finite difference method (GFDM). The method first discretizes the solution domain into a set of overlapping small subdomains, and then in each of the subdomains, the unknown functions and their derivatives are approximated by using the local Taylor series expansions and moving-least square approximation. The degree of the Taylor series used in the local subdomain is increased automatically in the regions near the crack-tips, in order to appropriately describe the local asymptotic behavior of near-tip displacement and stress fields. The path-independent J-integral and sub-domain technique are adopted to compute the dynamic stress intensity factors (SIFs) of the cracked bodies. Preliminary numerical experiments for dynamic SIFs with both uniform and variable loading conditions are given to show the efficient and accuracy of the present method for transient elastodynamic crack analysis.

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来源期刊
Results in Applied Mathematics
Results in Applied Mathematics Mathematics-Applied Mathematics
CiteScore
3.20
自引率
10.00%
发文量
50
审稿时长
23 days
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