The pointwise stabilities of piecewise linear finite element method on non-obtuse tetrahedral meshes of nonconvex polyhedra
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Publication:2025870
DOI10.1007/s10915-021-01465-4zbMath1465.65135arXiv2103.05223OpenAlexW3149403885MaRDI QIDQ2025870
Publication date: 17 May 2021
Published in: Journal of Scientific Computing (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2103.05223
Stability and convergence of numerical methods for boundary value problems involving PDEs (65N12) Finite element, Rayleigh-Ritz and Galerkin methods for boundary value problems involving PDEs (65N30)
Related Items (2)
Maximum-norm stability of the finite element method for the Neumann problem in nonconvex polygons with locally refined mesh ⋮ Weak discrete maximum principle of isoparametric finite element methods in curvilinear polyhedra
Cites Work
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- Hölder estimates for Green's functions on convex polyhedral domains and their applications to finite element methods
- Zur \(L^\infty\)-Konvergenz linearer finiter Elemente beim Dirichlet- Problem
- Über die punktweise Konvergenz finiter Elemente
- Maximum principle and uniform convergence for the finite element method
- Finite Element Pointwise Results on Convex Polyhedral Domains
- Maximum Principles for $P1$-Conforming Finite Element Approximations of Quasi-linear Second Order Elliptic Equations
- A Weak Discrete Maximum Principle and Stability of the Finite Element Method in L ∞ on Plane Polygonal Domains. I
- On the Quasi-Optimality in $L_\infty$ of the $\overset{\circ}{H}^1$-Projection into Finite Element Spaces*
- Some Optimal Error Estimates for Piecewise Linear Finite Element Approximations
- Optimal L ∞ Estimates for the Finite Element Method on Irregular Meshes
- Pointwise error estimates and asymptotic error expansion inequalities for the finite element method on irregular grids: Part I. Global estimates
- Weakened acute type condition for tetrahedral triangulations and the discrete maximum principle
- Weak discrete maximum principle of finite element methods in convex polyhedra
- Best approximation property in the $W^1_{\infty }$ norm for finite element methods on graded meshes
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