Pressure-improved Scott-Vogelius type elements.
IF 1.4
2区 数学
Q1 MATHEMATICS
引用次数: 0
Abstract
The Scott-Vogelius element is a popular finite element for the discretization of the Stokes equations which enjoys inf-sup stability and gives divergence-free velocity approximations. However, it is well known that the convergence rates for the discrete pressure deteriorate in the presence of certain critical vertices in a triangulation of the domain. Modifications of the Scott-Vogelius element such as the recently introduced pressure-wired Stokes element also suffer from this effect. In this paper we introduce a simple modification strategy for these pressure spaces that preserves the inf-sup stability while the pressure converges at an optimal rate.
压力改进的Scott-Vogelius型元件。
Scott-Vogelius单元是一种常用的用于Stokes方程离散化的有限元,它具有稳定性和无散度速度近似。然而,众所周知,在区域的三角剖分中存在某些临界顶点时,离散压力的收敛速度会恶化。Scott-Vogelius元件的改进,如最近引入的压力连线Stokes元件,也会受到这种影响。在本文中,我们对这些压力空间引入了一种简单的修正策略,在压力以最优速率收敛的同时保持了上支撑稳定性。
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
Calcolo
数学-数学
CiteScore
2.40
自引率
11.80%
发文量
36
审稿时长
>12 weeks
期刊介绍:
Calcolo is a quarterly of the Italian National Research Council, under the direction of the Institute for Informatics and Telematics in Pisa. Calcolo publishes original contributions in English on Numerical Analysis and its Applications, and on the Theory of Computation.
The main focus of the journal is on Numerical Linear Algebra, Approximation Theory and its Applications, Numerical Solution of Differential and Integral Equations, Computational Complexity, Algorithmics, Mathematical Aspects of Computer Science, Optimization Theory.
Expository papers will also appear from time to time as an introduction to emerging topics in one of the above mentioned fields. There will be a "Report" section, with abstracts of PhD Theses, news and reports from conferences and book reviews. All submissions will be carefully refereed.
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