We introduce a duality-based two-level error estimator for linear and nonlinear time-dependent problems. The error measure can be a space-time norm, energy norm, final-time error or other error related functional. The general methodology is developed for an abstract nonlinear parabolic PDE and subsequently applied to linear heat and nonlinear Cahn-Hilliard equations. The error due to finite element approximations is estimated with a residual weighted approximate-dual solution which is computed with two primal approximations at nested levels. We prove that the exact error is estimated by our estimator up to higher-order remainder terms. Numerical experiments confirm the theory regarding consistency of the dual-based two-level estimator. We a...
The aim of this article is to present an overview of recent developments in the area of a posteriori...
We develop an \textit{a posteriori} error analysis for a numerical estimate of the time at which a f...
AbstractDynamic finite element schemes are analyzed for second-order parabolic problems. These schem...
We introduce a duality-based two-level error estimator for linear and nonlinear time-dependent probl...
While many methods exist to discretize nonlinear time-dependent partial differential equations (PDEs...
While many methods exist to discretize nonlinear time-dependent partial differential equations (PDEs...
We propose an a posteriori error estimation technique for the computation of average functionals of ...
This work focuses on controlling the error and adapting the discretization in the context of parabol...
We use the elliptic reconstruction technique in combination with a duality approach to prove a poste...
This paper is concerned with the development and implementation of an adaptive solution algorithm fo...
We propose an a posteriori error estimation technique for the computation of average functionals of ...
Goal-oriented mesh adaptation, in particular using the dual-weighted residual (DWR) method, is known...
Two explicit error representation formulas are derived for degenerate parabolic PDEs, which are base...
We generalize the a posteriori techniques for the linear heat equation in [Ver03] to the case of the...
A posteriori error estimates for the heat equation in two space dimensions are presented. A classica...
The aim of this article is to present an overview of recent developments in the area of a posteriori...
We develop an \textit{a posteriori} error analysis for a numerical estimate of the time at which a f...
AbstractDynamic finite element schemes are analyzed for second-order parabolic problems. These schem...
We introduce a duality-based two-level error estimator for linear and nonlinear time-dependent probl...
While many methods exist to discretize nonlinear time-dependent partial differential equations (PDEs...
While many methods exist to discretize nonlinear time-dependent partial differential equations (PDEs...
We propose an a posteriori error estimation technique for the computation of average functionals of ...
This work focuses on controlling the error and adapting the discretization in the context of parabol...
We use the elliptic reconstruction technique in combination with a duality approach to prove a poste...
This paper is concerned with the development and implementation of an adaptive solution algorithm fo...
We propose an a posteriori error estimation technique for the computation of average functionals of ...
Goal-oriented mesh adaptation, in particular using the dual-weighted residual (DWR) method, is known...
Two explicit error representation formulas are derived for degenerate parabolic PDEs, which are base...
We generalize the a posteriori techniques for the linear heat equation in [Ver03] to the case of the...
A posteriori error estimates for the heat equation in two space dimensions are presented. A classica...
The aim of this article is to present an overview of recent developments in the area of a posteriori...
We develop an \textit{a posteriori} error analysis for a numerical estimate of the time at which a f...
AbstractDynamic finite element schemes are analyzed for second-order parabolic problems. These schem...