While many methods exist to discretize nonlinear time-dependent partial differential equations (PDEs), the rigorous estimation and adaptive control of their discretization errors remains challenging. In this paper, we present a methodology for duality-based a posteriori error estimation for nonlinear parabolic PDEs, where the full discretization of the PDE relies on the use of an implicit-explicit (IMEX) time-stepping scheme and the finite element method in space. The main result in our work is a decomposition of the error estimate that allows to separate the effects of spatial and temporal discretization error, and which can be used to drive adaptive mesh refinement and adaptive time-step selection. The decomposition hinges on a specially-...
We generalize the a posteriori techniques for the linear heat equation in [Ver03] to the case of the...
Se presenta una estimación a posteriori del error para el problema parabólico lineal, y se diseña el...
In this paper we derive a posteriori error estimates for the heat equation. The time discretization ...
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 introduce a duality-based two-level error estimator for linear and nonlinear time-dependent probl...
We introduce a duality-based two-level error estimator for linear and nonlinear time-dependent probl...
This work is devoted to the study of a posteriori error estimation and adaptivity in parabolic probl...
The aim of this paper is to develop an hp-version a posteriori error analysis for the time discretiz...
Two explicit error representation formulas are derived for degenerate parabolic PDEs, which are base...
This work focuses on controlling the error and adapting the discretization in the context of parabol...
This work is concerned with the development of a space-time adaptive numerical method, based on a ri...
We propose an a posteriori error estimation technique for the computation of average functionals of ...
We consider fully discrete time-space approximations of abstract linear parabolic partial differenti...
We report the recent progress in deriving sharp a posteriori error estimates for linear and nonlinea...
We generalize the a posteriori techniques for the linear heat equation in [Ver03] to the case of the...
Se presenta una estimación a posteriori del error para el problema parabólico lineal, y se diseña el...
In this paper we derive a posteriori error estimates for the heat equation. The time discretization ...
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 introduce a duality-based two-level error estimator for linear and nonlinear time-dependent probl...
We introduce a duality-based two-level error estimator for linear and nonlinear time-dependent probl...
This work is devoted to the study of a posteriori error estimation and adaptivity in parabolic probl...
The aim of this paper is to develop an hp-version a posteriori error analysis for the time discretiz...
Two explicit error representation formulas are derived for degenerate parabolic PDEs, which are base...
This work focuses on controlling the error and adapting the discretization in the context of parabol...
This work is concerned with the development of a space-time adaptive numerical method, based on a ri...
We propose an a posteriori error estimation technique for the computation of average functionals of ...
We consider fully discrete time-space approximations of abstract linear parabolic partial differenti...
We report the recent progress in deriving sharp a posteriori error estimates for linear and nonlinea...
We generalize the a posteriori techniques for the linear heat equation in [Ver03] to the case of the...
Se presenta una estimación a posteriori del error para el problema parabólico lineal, y se diseña el...
In this paper we derive a posteriori error estimates for the heat equation. The time discretization ...