Richardson Extrapolation: An Info-Gap Analysis of Numerical Uncertainty

IF 0.5 Q4 ENGINEERING, MECHANICAL
Y. Ben-Haim, F. Hemez
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引用次数: 0

Abstract

Computational modeling and simulation is a central tool in science and engineering, directed at solving partial differential equations for which analytical solutions are unavailable. The continuous equations are generally discretized in time, space, energy, etc., to obtain approximate solutions using a numerical method. The aspiration is for the numerical solutions to asymptotically converge to the exact-but-unknown solution as the discretization size approaches zero. A generally applicable procedure to assure convergence is unavailable. The Richardson extrapolation is the main method for dealing with this challenge, but its assumptions introduce uncertainty to the resulting approximation. We use info-gap decision theory to model and manage its main uncertainty, namely, in the rate of convergence of numerical solutions. The theory is illustrated with a numerical application to Hertz contact in solid mechanics.
Richardson外推法:数值不确定性的信息缺口分析
计算建模和模拟是科学和工程中的核心工具,用于解决无法用解析解求解的偏微分方程。一般将连续方程在时间、空间、能量等方面离散化,用数值方法求得近似解。期望是数值解渐近收敛到精确但未知的解,因为离散大小接近于零。没有一个普遍适用的程序来保证收敛。理查德森外推法是处理这一挑战的主要方法,但它的假设给所得到的近似引入了不确定性。我们使用信息缺口决策理论来建模和管理其主要的不确定性,即数值解的收敛速度。最后以固体力学中赫兹接触的数值应用说明了这一理论。
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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