Stability and convergence of the Ritz map in the maximum norm for nonconforming finite elements

Anisotropic mesh refinement in polyhedral domains: error estimates with data in

Thomas Apel
Ariel L. Lombardi
Max Winkler

July 2014

The paper is concerned with the finite element solution of the Poisson equation with homogeneous Dir...

The finite element solution of second order elliptic problems with the Newton boundary condition

Čermák, Libor

January 1983

summary:The convergence of the finite element solution for the second order elliptic problem in the ...

Anisotropic regularity and optimal rates of convergence for the finite element method on three dimensional polyhedral domains

Anna L. Mazzucato
Victor Nistor

January 2012

Abstract. We consider the model Poisson problem −∆u = f ∈ Ω, u = g on ∂Ω, where Ω is a bounded polyh...

Optimal W$^{1,∞}$-estimates for an isoparametric finite element discretization of elliptic boundary value problems

Dörich, Benjamin
Leibold, Jan
Maier, Bernhard

February 2022

In this paper, we consider an elliptic boundary value problem on a domain with regular boundary and ...

Stability and convergence of the Ritz map in the maximum norm for nonconforming finite elements

Dörich, Benjamin
Leibold, Jan
Maier, Bernhard

December 2021

In this report, we consider the Poisson problem on a domain with regular boundary and discretize it ...

A Refined Finite Element Convergence Theory for Highly Indefinite Helmholtz Problems

Sauter, S.

June 2018

Abstract.: It is well known that standard h-version finite element discretisations using lowest orde...

An isogeometric mortar method for the coupling of multiple NURBS domains with optimal convergence rates

Dornisch, Wolfgang
Stöckler, Joachim

September 2019

We investigate the mortar finite element method for second order elliptic boundary value problems on...

A new a priori error analysis of nonconforming and mixed finite element methods

Li, Mingxia
Mao, Shipeng

January 2013

AbstractIn this short paper, we derive an a priori error analysis for the lowest order nonconforming...

Anisotropic mesh refinement in polyhedral domains: error estimates with data in L 2 (Ω)

Apel, Thomas
Lombardi, Ariel Luis
Winkler, Max

August 2014

The paper is concerned with the finite element solution of the Poisson equation with homogeneous Dir...

MAXIMUM-NORM STABILITY, SMOOTHING AND RESOLVENT ESTIMATES FOR PARABOLIC FINITE ELEMENT EQUATIONS

Dedicated To Michel Crouzeix

September 2016

Abstract. We survey work on stability and smoothing estimates in maximum-norm for spatially semidisc...

Maximum norm error bounds for the full discretization of non-autonomous wave equations

Dörich, Benjamin
Leibold, Jan
Maier, Bernhard

December 2021

In the present paper, we consider a specific class of non-autonomous wave equations on a smooth, bou...

Maximum-norm stability of the finite element Ritz projection under mixed boundary conditions

Leykekhman, D
Li, BY

January 2017

As a model of the second order elliptic equation with non-trivial boundary conditions, we consider t...

Higher order finite element approximation of a quasilinear elliptic boundary value problem of a non-monotone type

Liu, Liping
Křížek, Michal
Neittaanmäki, Pekka

January 1996

summary:A nonlinear elliptic partial differential equation with homogeneous Dirichlet boundary condi...

Finite element approximations in a non-lipschitz domain: part II

Acosta, Gabriel
Armentano, Maria Gabriela

September 2011

In a paper by R. Dur ́ an, A. Lombardi, and the authors (2007) the finite element method was applied...

A priori regularity results for discrete solutions to elliptic problems

Toni Scharle

January 2020

This thesis is concerned with the development and analysis of a discrete counterpart of the well-kno...

Anisotropic mesh refinement in polyhedral domains: error estimates with data in

Thomas Apel
Ariel L. Lombardi
Max Winkler

July 2014

The paper is concerned with the finite element solution of the Poisson equation with homogeneous Dir...

The finite element solution of second order elliptic problems with the Newton boundary condition

Čermák, Libor

January 1983

summary:The convergence of the finite element solution for the second order elliptic problem in the ...

Anisotropic regularity and optimal rates of convergence for the finite element method on three dimensional polyhedral domains

Anna L. Mazzucato
Victor Nistor

January 2012

Abstract. We consider the model Poisson problem −∆u = f ∈ Ω, u = g on ∂Ω, where Ω is a bounded polyh...

Optimal W$^{1,∞}$-estimates for an isoparametric finite element discretization of elliptic boundary value problems

Dörich, Benjamin
Leibold, Jan
Maier, Bernhard

February 2022

In this paper, we consider an elliptic boundary value problem on a domain with regular boundary and ...

Stability and convergence of the Ritz map in the maximum norm for nonconforming finite elements

Dörich, Benjamin
Leibold, Jan
Maier, Bernhard

December 2021

In this report, we consider the Poisson problem on a domain with regular boundary and discretize it ...

A Refined Finite Element Convergence Theory for Highly Indefinite Helmholtz Problems

Sauter, S.

June 2018

Abstract.: It is well known that standard h-version finite element discretisations using lowest orde...

An isogeometric mortar method for the coupling of multiple NURBS domains with optimal convergence rates

Dornisch, Wolfgang
Stöckler, Joachim

September 2019

We investigate the mortar finite element method for second order elliptic boundary value problems on...

A new a priori error analysis of nonconforming and mixed finite element methods

Li, Mingxia
Mao, Shipeng

January 2013

AbstractIn this short paper, we derive an a priori error analysis for the lowest order nonconforming...

Anisotropic mesh refinement in polyhedral domains: error estimates with data in L 2 (Ω)

Apel, Thomas
Lombardi, Ariel Luis
Winkler, Max

August 2014

The paper is concerned with the finite element solution of the Poisson equation with homogeneous Dir...

MAXIMUM-NORM STABILITY, SMOOTHING AND RESOLVENT ESTIMATES FOR PARABOLIC FINITE ELEMENT EQUATIONS

Dedicated To Michel Crouzeix

September 2016

Abstract. We survey work on stability and smoothing estimates in maximum-norm for spatially semidisc...

Maximum norm error bounds for the full discretization of non-autonomous wave equations

Dörich, Benjamin
Leibold, Jan
Maier, Bernhard

December 2021

In the present paper, we consider a specific class of non-autonomous wave equations on a smooth, bou...

Maximum-norm stability of the finite element Ritz projection under mixed boundary conditions

Leykekhman, D
Li, BY

January 2017

As a model of the second order elliptic equation with non-trivial boundary conditions, we consider t...

Higher order finite element approximation of a quasilinear elliptic boundary value problem of a non-monotone type

Liu, Liping
Křížek, Michal
Neittaanmäki, Pekka

January 1996

summary:A nonlinear elliptic partial differential equation with homogeneous Dirichlet boundary condi...

Finite element approximations in a non-lipschitz domain: part II

Acosta, Gabriel
Armentano, Maria Gabriela

September 2011

In a paper by R. Dur ́ an, A. Lombardi, and the authors (2007) the finite element method was applied...

A priori regularity results for discrete solutions to elliptic problems

Toni Scharle

January 2020

This thesis is concerned with the development and analysis of a discrete counterpart of the well-kno...

Anisotropic mesh refinement in polyhedral domains: error estimates with data in

Thomas Apel
Ariel L. Lombardi
Max Winkler

July 2014

The paper is concerned with the finite element solution of the Poisson equation with homogeneous Dir...

The finite element solution of second order elliptic problems with the Newton boundary condition

Čermák, Libor

January 1983

summary:The convergence of the finite element solution for the second order elliptic problem in the ...

Anisotropic regularity and optimal rates of convergence for the finite element method on three dimensional polyhedral domains

Anna L. Mazzucato
Victor Nistor

January 2012

Abstract. We consider the model Poisson problem −∆u = f ∈ Ω, u = g on ∂Ω, where Ω is a bounded polyh...

Stability and convergence of the Ritz map in the maximum norm for nonconforming finite elements

Abstract

Extracted data

Stability and convergence of the Ritz map in the maximum norm for nonconforming finite elements

Abstract

Extracted data

Related items

Related items