双调和方程
数学
离散化
三角测量
间断伽辽金法
多项式次数
多项式的
理论(学习稳定性)
有限元法
应用数学
惩罚法
实现(概率)
多边形网格
数学分析
数学优化
几何学
计算机科学
边值问题
统计
热力学
物理
机器学习
作者
Philipp Bringmann,Carsten Carstensen,Julian Streitberger
标识
DOI:10.1515/jnma-2023-0028
摘要
Abstract The symmetric C 0 interior penalty method is one of the most popular discontinuous Galerkin methods for the biharmonic equation. This paper introduces an automatic local selection of the involved stability parameter in terms of the geometry of the underlying triangulation for arbitrary polynomial degrees. The proposed choice ensures a stable discretization with guaranteed discrete ellipticity constant. Numerical evidence for uniform and adaptive mesh refinement and various polynomial degrees supports the reliability and efficiency of the local parameter selection and recommends this in practice. The approach is documented in 2D for triangles, but the methodology behind can be generalized to higher dimensions, to non-uniform polynomial degrees, and to rectangular discretizations. An appendix presents the realization of our proposed parameter selection in various established finite element software packages.
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