A New Approach to the Analysis of Parametric Finite Element Approximations to Mean Curvature Flow
出版年份 2023 全文链接
标题
A New Approach to the Analysis of Parametric Finite Element Approximations to Mean Curvature Flow
作者
关键词
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出版物
FOUNDATIONS OF COMPUTATIONAL MATHEMATICS
Volume -, Issue -, Pages -
出版商
Springer Science and Business Media LLC
发表日期
2023-10-18
DOI
10.1007/s10208-023-09622-x
参考文献
相关参考文献
注意:仅列出部分参考文献,下载原文获取全部文献信息。- Erratum: Convergence of Dziuk’s Semidiscrete Finite Element Method for Mean Curvature Flow of Closed Surfaces with High-Order Finite Elements
- (2023) Genming Bai et al. SIAM JOURNAL ON NUMERICAL ANALYSIS
- Finite element error analysis for a system coupling surface evolution to diffusion on the surface
- (2022) Klaus Deckelnick et al. INTERFACES AND FREE BOUNDARIES
- Numerical analysis for the interaction of mean curvature flow and diffusion on closed surfaces
- (2022) Charles M. Elliott et al. NUMERISCHE MATHEMATIK
- Evolving finite element methods with an artificial tangential velocity for mean curvature flow and Willmore flow
- (2022) Jiashun Hu et al. NUMERISCHE MATHEMATIK
- A convergent finite element algorithm for generalized mean curvature flows of closed surfaces
- (2021) Tim Binz et al. IMA JOURNAL OF NUMERICAL ANALYSIS
- A convergent evolving finite element algorithm for Willmore flow of closed surfaces
- (2021) Balázs Kovács et al. NUMERISCHE MATHEMATIK
- A Parametric Finite Element Method for Solid-State Dewetting Problems in Three Dimensions
- (2020) Quan Zhao et al. SIAM JOURNAL ON SCIENTIFIC COMPUTING
- A finite element error analysis for axisymmetric mean curvature flow
- (2020) John W Barrett et al. IMA JOURNAL OF NUMERICAL ANALYSIS
- A convergent evolving finite element algorithm for mean curvature flow of closed surfaces
- (2019) Balázs Kovács et al. NUMERISCHE MATHEMATIK
- High-order evolving surface finite element method for parabolic problems on evolving surfaces
- (2017) Balázs Kovács IMA JOURNAL OF NUMERICAL ANALYSIS
- A parametric finite element method for solid-state dewetting problems with anisotropic surface energies
- (2017) Weizhu Bao et al. JOURNAL OF COMPUTATIONAL PHYSICS
- Convergence of finite elements on an evolving surface driven by diffusion on the surface
- (2017) Balázs Kovács et al. NUMERISCHE MATHEMATIK
- Numerical Analysis for a System Coupling Curve Evolution to Reaction Diffusion on the Curve
- (2017) John W. Barrett et al. SIAM JOURNAL ON NUMERICAL ANALYSIS
- Analysis of symmetric interior penalty discontinuous Galerkin methods for the Allen–Cahn equation and the mean curvature flow
- (2014) Xiaobing Feng et al. IMA JOURNAL OF NUMERICAL ANALYSIS
- A simple scheme for the approximation of the elastic flow of inextensible curves
- (2013) S. Bartels IMA JOURNAL OF NUMERICAL ANALYSIS
- Scalar conservation laws on moving hypersurfaces
- (2013) Gerhard Dziuk et al. INTERFACES AND FREE BOUNDARIES
- A Fully Discrete Evolving Surface Finite Element Method
- (2012) Gerhard Dziuk et al. SIAM JOURNAL ON NUMERICAL ANALYSIS
- Robust A Priori and A Posteriori Error Analysis for the Approximation of Allen–Cahn and Ginzburg–Landau Equations Past Topological Changes
- (2011) Sören Bartels et al. SIAM JOURNAL ON NUMERICAL ANALYSIS
- Parametric FEM for geometric biomembranes
- (2010) Andrea Bonito et al. JOURNAL OF COMPUTATIONAL PHYSICS
- Error analysis for the elastic flow of parametrized curves
- (2009) Klaus Deckelnick et al. MATHEMATICS OF COMPUTATION
- Higher-Order Finite Element Methods and Pointwise Error Estimates for Elliptic Problems on Surfaces
- (2009) Alan Demlow SIAM JOURNAL ON NUMERICAL ANALYSIS
- Computational parametric Willmore flow
- (2008) Gerhard Dziuk NUMERISCHE MATHEMATIK
- Parametric Approximation of Willmore Flow and Related Geometric Evolution Equations
- (2008) John W. Barrett et al. SIAM JOURNAL ON SCIENTIFIC COMPUTING
- On the parametric finite element approximation of evolving hypersurfaces in R3
- (2007) John W. Barrett et al. JOURNAL OF COMPUTATIONAL PHYSICS
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