In this paper we aim at controlling physically meaningful quantities with emphasis on environmental applications. This is carried out by an efficient numerical procedure combining the goal-oriented framework [R. Becker, R. Rannacher, An optimal control approach to a posteriori error estimation in finite element methods, Acta Numer. 10 (2001) 1–102] with the anisotropic setting introduced in [L. Formaggia, S. Perotto, New anisotropic a priori error estimates, Numer. Math. 89 (2001) 641–667]. A first attempt in this direction has been proposed in [L. Formaggia, S. Micheletti, S. Perotto, Anisotropic mesh adaptation in computational fluid dynamics: application to the advection–diffusion–reaction and the Stokes problems, Appl. Numer. Math. 51 (...
Many physical problems lead to boundary value problems for partial differential equations, which can...
The paper presents a posteriori error estimators for the stationary Stokes problem. We consider anis...
We consider a singularly perturbed reaction-diffusion problem and derive and rigorously analyse an a...
In this paper we aim at controlling physically meaningful quantities with emphasis on environmental ...
We provide a unifying framework that generalizes the 2D and 3D settings proposed in [32] and [17], ...
In an anisotropic adaptive finite element algorithm one usually needs an error estimator that yields...
When the finite element method is used to solve boundary value problems, the corresponding finite el...
We present a goal-oriented error analysis for the calculation of low Reynolds steady compressible fl...
A basic feature in finite-element method (FEM) is the initial choice of an interpolation for the unk...
In this work we develop an anisotropic a posteriori error analysis of the advection–diffusion–reacti...
Our main goal in this talk is to present residual-type a posteriori error estimates in the maximum n...
A recovery-based error estimator for anisotropic mesh adaptation in CFD∗ P.E. Farrell†, S. Michelett...
Many physical problems lead to boundary value problems for partial differential equations, which can...
The paper presents a posteriori error estimators for the stationary Stokes problem. We consider anis...
We consider a singularly perturbed reaction-diffusion problem and derive and rigorously analyse an a...
In this paper we aim at controlling physically meaningful quantities with emphasis on environmental ...
We provide a unifying framework that generalizes the 2D and 3D settings proposed in [32] and [17], ...
In an anisotropic adaptive finite element algorithm one usually needs an error estimator that yields...
When the finite element method is used to solve boundary value problems, the corresponding finite el...
We present a goal-oriented error analysis for the calculation of low Reynolds steady compressible fl...
A basic feature in finite-element method (FEM) is the initial choice of an interpolation for the unk...
In this work we develop an anisotropic a posteriori error analysis of the advection–diffusion–reacti...
Our main goal in this talk is to present residual-type a posteriori error estimates in the maximum n...
A recovery-based error estimator for anisotropic mesh adaptation in CFD∗ P.E. Farrell†, S. Michelett...
Many physical problems lead to boundary value problems for partial differential equations, which can...
The paper presents a posteriori error estimators for the stationary Stokes problem. We consider anis...
We consider a singularly perturbed reaction-diffusion problem and derive and rigorously analyse an a...