Effective Convergence Checks for Verifying Finite Element Stresses at Three-Dimensional Stress Concentrations

IF 0.5 Q4 ENGINEERING, MECHANICAL
Jeffrey R. Beisheim, G. Sinclair, P. Roache
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引用次数: 10

Abstract

Current computational capabilities facilitate the application of finite element analysis (FEA) to three-dimensional geometries to determine peak stresses. The three-dimensional stress concentrations so quantified are useful in practice provided the discretization error attending their determination with finite elements has been sufficiently controlled. Here, we provide some convergence checks and companion a posteriori error estimates that can be used to verify such three-dimensional FEA, and thus enable engineers to control discretization errors. These checks are designed to promote conservative error estimation. They are applied to twelve three-dimensional test problems that have exact solutions for their peak stresses. Error levels in the FEA of these peak stresses are classified in accordance with: 1–5%, satisfactory; 1/5–1%, good; and <1/5%, excellent. The present convergence checks result in 111 error assessments for the test problems. For these 111, errors are assessed as being at the same level as true exact errors on 99 occasions, one level worse for the other 12. Hence, stress error estimation that is largely reasonably accurate (89%), and otherwise modestly conservative (11%).
三维应力集中下有限元应力验证的有效收敛校核
当前的计算能力促进了有限元分析(FEA)对三维几何形状的应用,以确定峰值应力。如果有限元法确定三维应力集中的离散误差得到充分控制,那么这样量化的三维应力集中在实际应用中是有用的。在这里,我们提供了一些收敛性检查和伴随的后验误差估计,可用于验证这种三维有限元,从而使工程师能够控制离散化误差。这些检查旨在促进保守误差估计。它们被应用于12个三维测试问题,它们的峰值应力有精确的解。这些峰值应力在有限元分析中的误差水平按以下顺序分类:1-5%,满意;1/5 - 1%,好;<1/5%,很好。目前的收敛性检查对测试问题进行了111次错误评估。对于这111种情况,有99种情况的错误被评估为与真实精确错误处于同一级别,另外12种情况的一个级别更差。因此,应力误差估计在很大程度上是合理准确的(89%),而在其他方面则适度保守(11%)。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
1.60
自引率
16.70%
发文量
12
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