This article investigates an explicit a-posteriori error estimator for the finite element approximation of the compressible Navier–Stokes equations. The proposed methodology employs the Variational Multi-Scale framework, and specifically, the idea is to use the variational subscales to estimate the error. These subscales are defined to be orthogonal to the finite element space, dynamic and non-linear, and both the subscales in the interior of the element and on the element boundaries are considered. Another particularity of the model is that we define some norms that lead to a dimensionally consistent measure of the compressible flow solution error inside each element; a scaled -norm, and the calculation of a physical entropy measure, are b...
Purpose The purpose of this paper is to apply the variational multi-scale framework to the finite e...
ii This work presents an error estimation framework for a mixed displacement-pressure finite element...
AbstractThe paper presents a finite element error analysis for a projection-based variational multis...
This article investigates an explicit a-posteriori error estimator for the finite element approximat...
International audienceThis work is motivated by the success of the anisotropic adaptive finite eleme...
International audienceIn this work, we present a new a posteriori error estimator based on the Varia...
This thesis investigates numerical methods that approximate the solution of compressible flow equati...
A-posteriori error estimation of convection-dominated and hyperbolic flow problems remains one of th...
International audienceThis paper extends explicit a posteriori error estimators based on the variati...
The paper presents finite element error estimates of a variational multiscale method (VMS) for the i...
This work presents an error estimation framework for a mixed displacement-pressure finite element me...
Abstract. A-posteriori error estimation of convection-dominated and hyperbolic flow problems remains...
We consider adaptive streamline diffusion finite element methods with error control for compressible...
In this work an explicit a posteriori error estimator for the steady incompressible Navier–Stokes eq...
We derive estimates for the error in a variational approximation of the lift and drag coefficients o...
Purpose The purpose of this paper is to apply the variational multi-scale framework to the finite e...
ii This work presents an error estimation framework for a mixed displacement-pressure finite element...
AbstractThe paper presents a finite element error analysis for a projection-based variational multis...
This article investigates an explicit a-posteriori error estimator for the finite element approximat...
International audienceThis work is motivated by the success of the anisotropic adaptive finite eleme...
International audienceIn this work, we present a new a posteriori error estimator based on the Varia...
This thesis investigates numerical methods that approximate the solution of compressible flow equati...
A-posteriori error estimation of convection-dominated and hyperbolic flow problems remains one of th...
International audienceThis paper extends explicit a posteriori error estimators based on the variati...
The paper presents finite element error estimates of a variational multiscale method (VMS) for the i...
This work presents an error estimation framework for a mixed displacement-pressure finite element me...
Abstract. A-posteriori error estimation of convection-dominated and hyperbolic flow problems remains...
We consider adaptive streamline diffusion finite element methods with error control for compressible...
In this work an explicit a posteriori error estimator for the steady incompressible Navier–Stokes eq...
We derive estimates for the error in a variational approximation of the lift and drag coefficients o...
Purpose The purpose of this paper is to apply the variational multi-scale framework to the finite e...
ii This work presents an error estimation framework for a mixed displacement-pressure finite element...
AbstractThe paper presents a finite element error analysis for a projection-based variational multis...