Abstract. We derive a computable a posteriori error estimator for the α-harmonic extension problem, which localizes the fractional powers of elliptic operators supplemented with Dirichlet boundary conditions. Our a posteriori error estimator relies on the solution of small discrete problems on anisotropic cylindrical stars. It exhibits built-in flux equilibration and is equivalent to the energy error up to data oscillation, under suitable assumptions. We design a simple adaptive algorithm and present numerical experiments which reveal a competitive performance. 1
International audienceAbstract The major emphasis of this work is the derivation of a posteriori err...
Abstract. We study solution techniques for evolution equations with fractional diffusion and fractio...
International audienceThis article is a review on basic concepts and tools devoted to a posteriori e...
Abstract. We derive a computable a posteriori error estimator for the α-harmonic extension problem, ...
This dissertation presents a decisive advance in the numerical solution and analysis of fractional d...
Abstract. The purpose of this work is the study of solution techniques for problems involv-ing fract...
Abstract. The purpose of this work is the study of solution techniques for problems involv-ing fract...
In this paper we consider a sub-diffusion problem where the fractional time derivative is approximat...
This dissertation presents a decisive advance in the numerical solution and analysis of fractional d...
We develop a novel a posteriori error estimator for the L2 error committed by the finite ele- ment d...
This manuscript is concerned with a posteriori error estimation for the finiteelement discretization...
The paper is devoted to complementary approaches in a posteriori error estimation for a diffusion-re...
Abstract. We consider the initial boundary value problem for the ho-mogeneous time-fractional diffus...
Considering the Dirichlet problem for Poisson's equation in two and three dimensions, we derive a po...
Il est actuellement établi que pour les milieux hétérogènes généraux, la loi classique de Fick doit ...
International audienceAbstract The major emphasis of this work is the derivation of a posteriori err...
Abstract. We study solution techniques for evolution equations with fractional diffusion and fractio...
International audienceThis article is a review on basic concepts and tools devoted to a posteriori e...
Abstract. We derive a computable a posteriori error estimator for the α-harmonic extension problem, ...
This dissertation presents a decisive advance in the numerical solution and analysis of fractional d...
Abstract. The purpose of this work is the study of solution techniques for problems involv-ing fract...
Abstract. The purpose of this work is the study of solution techniques for problems involv-ing fract...
In this paper we consider a sub-diffusion problem where the fractional time derivative is approximat...
This dissertation presents a decisive advance in the numerical solution and analysis of fractional d...
We develop a novel a posteriori error estimator for the L2 error committed by the finite ele- ment d...
This manuscript is concerned with a posteriori error estimation for the finiteelement discretization...
The paper is devoted to complementary approaches in a posteriori error estimation for a diffusion-re...
Abstract. We consider the initial boundary value problem for the ho-mogeneous time-fractional diffus...
Considering the Dirichlet problem for Poisson's equation in two and three dimensions, we derive a po...
Il est actuellement établi que pour les milieux hétérogènes généraux, la loi classique de Fick doit ...
International audienceAbstract The major emphasis of this work is the derivation of a posteriori err...
Abstract. We study solution techniques for evolution equations with fractional diffusion and fractio...
International audienceThis article is a review on basic concepts and tools devoted to a posteriori e...