裂纹问题权函数法的可选积分方法

Q4 Chemical Engineering

Applied and Computational Mechanics Pub Date : 2021-05-09 DOI:10.22055/JACM.2021.37137.2968

M. Eder, Xiao Chen

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引用次数: 1

摘要

本研究提出了两种替代方法来补充线性弹性裂纹问题的权函数法中使用的现有积分策略。第一种方法基于插值型积分方案，第二种方法基于高斯求积。所提出的方法能够实现计算高效的数值积分，用于计算2D裂缝问题中的应力强度因子。该效率是通过较低数量的积分点获得的，该积分点由高阶近似促进。对于给定的裂纹长宽比，积分权重只需要计算一次，并且可以应用于任意连续和平滑的应力分布。所提出的方法显示出极好的准确性。特别是，与最常用的梯形积分相比，高斯求积方法的精度高出几个数量级。

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Alternative Integration Approaches in the Weight Function Method for Crack Problems

This study proposes two alternative approaches to complement existing integration strategies used in the weight function method for linear elastic crack problems. The first approach is based on an interpolation type integration scheme and the second approach is based on Gauss quadrature. The proposed approaches enable a computationally efficient numerical integration for computing stress intensity factors in 2D fracture problems. The efficiency is gained through a comparatively low number of integration points facilitated by higher-order approximation. The integration weights only need to be computed once for a given crack length-to-width ratio and can be applied to arbitrary continuous and smooth stress distributions. The proposed approaches show excellent accuracy. In particular, the Gauss quadrature approach exhibits several orders of magnitude more accuracy compared to the most commonly used trapezoidal integration.

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来源期刊

Applied and Computational Mechanics Engineering-Computational Mechanics

CiteScore

0.80

自引率

0.00%

发文量

审稿时长

14 weeks

期刊介绍： The ACM journal covers a broad spectrum of topics in all fields of applied and computational mechanics with special emphasis on mathematical modelling and numerical simulations with experimental support, if relevant. Our audience is the international scientific community, academics as well as engineers interested in such disciplines. Original research papers falling into the following areas are considered for possible publication: solid mechanics, mechanics of materials, thermodynamics, biomechanics and mechanobiology, fluid-structure interaction, dynamics of multibody systems, mechatronics, vibrations and waves, reliability and durability of structures, structural damage and fracture mechanics, heterogenous media and multiscale problems, structural mechanics, experimental methods in mechanics. This list is neither exhaustive nor fixed.