International audienceWe consider the a posteriori error analysis of approximations of parabolic problems based on arbitrarily high-order conforming Galerkin spatial discretizations and arbitrarily high-order discontinuous Galerkin temporal discretizations. Using equilibrated flux reconstructions , we present a posteriori error estimates for a norm composed of the $L^2(H^1)\cap H^1(H^{-1})$-norm of the error and the temporal jumps of the numerical solution. The estimators provide guaranteed upper bounds for this norm, without unknown constants. Furthermore, the efficiency of the estimators with respect to this norm is local in both space and time, with constants that are robust with respect to the mesh-size, time-step size, and the spatial ...
Abstract. We derive a posteriori error estimates for fully discrete approxi-mations to solutions of ...
We report the recent progress in deriving sharp a posteriori error estimates for linear and nonlinea...
Classical implicit residual type error estimators require using an underlying spatial finer mesh to ...
International audienceWe consider the a posteriori error analysis of approximations of parabolic pro...
International audienceWe consider the a posteriori error analysis of fully discrete approximations o...
We derive energy-norm a posteriori error bounds for an Euler time-stepping method combined with vari...
Abstract. We prove pointwise a posteriori error estimates for semi- and fully-discrete finite elemen...
We consider fully discrete time-space approximations of abstract linear parabolic partial differenti...
Abstract. We derive energy-norm a posteriori error bounds for an Euler timestepping method combined ...
Classical implicit residual type error estimators require using an underlying spatial finer mesh to ...
Abstract. A semilinear second-order parabolic equation is considered in a regular and a singularly-p...
Abstract. A semilinear second-order parabolic equation is considered in a regular and a singularly-p...
Two explicit error representation formulas are derived for degenerate parabolic PDEs, which are base...
A semilinear second-order parabolic equation is considered in a regular and a singularly perturbed r...
Abstract. A semilinear second-order parabolic equation is considered in a regular and a singularly-p...
Abstract. We derive a posteriori error estimates for fully discrete approxi-mations to solutions of ...
We report the recent progress in deriving sharp a posteriori error estimates for linear and nonlinea...
Classical implicit residual type error estimators require using an underlying spatial finer mesh to ...
International audienceWe consider the a posteriori error analysis of approximations of parabolic pro...
International audienceWe consider the a posteriori error analysis of fully discrete approximations o...
We derive energy-norm a posteriori error bounds for an Euler time-stepping method combined with vari...
Abstract. We prove pointwise a posteriori error estimates for semi- and fully-discrete finite elemen...
We consider fully discrete time-space approximations of abstract linear parabolic partial differenti...
Abstract. We derive energy-norm a posteriori error bounds for an Euler timestepping method combined ...
Classical implicit residual type error estimators require using an underlying spatial finer mesh to ...
Abstract. A semilinear second-order parabolic equation is considered in a regular and a singularly-p...
Abstract. A semilinear second-order parabolic equation is considered in a regular and a singularly-p...
Two explicit error representation formulas are derived for degenerate parabolic PDEs, which are base...
A semilinear second-order parabolic equation is considered in a regular and a singularly perturbed r...
Abstract. A semilinear second-order parabolic equation is considered in a regular and a singularly-p...
Abstract. We derive a posteriori error estimates for fully discrete approxi-mations to solutions of ...
We report the recent progress in deriving sharp a posteriori error estimates for linear and nonlinea...
Classical implicit residual type error estimators require using an underlying spatial finer mesh to ...