Error analysis of higher order Trace Finite Element Methods for the surface Stokes equation

IF 3.8 2区 数学 Q1 MATHEMATICS Journal of Numerical Mathematics Pub Date : 2020-03-16 DOI:10.1515/jnma-2020-0017
Thomas Jankuhn, M. Olshanskii, A. Reusken, Alexander Zhiliakov
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引用次数: 18

Abstract

Abstract The paper studies a higher order unfitted finite element method for the Stokes system posed on a surface in ℝ3. The method employs parametric Pk-Pk−1 finite element pairs on tetrahedral bulk mesh to discretize the Stokes system on embedded surface. Stability and optimal order convergence results are proved. The proofs include a complete quantification of geometric errors stemming from approximate parametric representation of the surface. Numerical experiments include formal convergence studies and an example of the Kelvin–Helmholtz instability problem on the unit sphere.
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曲面Stokes方程的高阶轨迹有限元法误差分析
摘要本文研究了一个高阶非拟合有限元方法,该方法适用于给定曲面上的Stokes系统。该方法采用四面体体网格上的参数化Pk-Pk−1有限元对对嵌入表面上的Stokes系统进行离散化。证明了算法的稳定性和最优阶收敛性。这些证明包括由曲面的近似参数表示产生的几何误差的完整量化。数值实验包括形式收敛研究和单位球上Kelvin-Helmholtz不稳定性问题的一个例子。
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
5.90
自引率
3.30%
发文量
17
审稿时长
>12 weeks
期刊介绍: The Journal of Numerical Mathematics (formerly East-West Journal of Numerical Mathematics) contains high-quality papers featuring contemporary research in all areas of Numerical Mathematics. This includes the development, analysis, and implementation of new and innovative methods in Numerical Linear Algebra, Numerical Analysis, Optimal Control/Optimization, and Scientific Computing. The journal will also publish applications-oriented papers with significant mathematical content in computational fluid dynamics and other areas of computational engineering, finance, and life sciences.
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