We develop and compare a number of alternative approaches to obtain guaranteed and fully computable bounds on the error in quantities of interest of arbitrary order finite element approximations in the context of a linear second-order elliptic problem. In each case, the bounds are fully computable and do not involve any unknown multiplicative factors. Guaranteed computable bounds are also obtained for the case when the Dirichlet boundary conditions are non-homogeneous. This is achieved by taking account of the error incurred by the approximation of the Dirichlet data in the functional used to approximate the quantity of interest itself, which is found to generally give better results. Numerical examples are presented to show that the result...
AbstractWe present guaranteed and computable both sided error bounds for the discontinuous Galerkin ...
International audienceThis paper is a revisit of the work [Ladevèze and Pelle, Int. J. Numer. Method...
summary:We consider finite element approximations of a second order elliptic problem on a bounded po...
AbstractIn this paper, we discuss with guaranteed a priori and a posteriori error estimates of finit...
We obtain a fully computable a posteriori error bound on the broken energy norm of the error in the ...
We give an overview of our recent progress in developing a framework for the derivation of fully com...
International audienceThis paper deals with the verification of simulations performed using the fini...
Kyushu University 21st Century COE Program Development of Dynamic Mathematics with High Functionalit...
The values of constants appearing in error estimates of approximations by finite element methods pla...
The classic Lp -based estimates for solutions of elliptic partial differential equations satisfying ...
The classic Lp-based estimates for solutions of elliptic partial differential equa-tions satisfying ...
We obtain fully computable a posteriori error bounds on the broken energy seminorm and discontinuous...
Abstract. We obtain a computable a posteriori error bound on the broken energy norm of the error in ...
AbstractWe present guaranteed and computable both sided error bounds for the discontinuous Galerkin ...
International audienceThis paper is a revisit of the work [Ladevèze and Pelle, Int. J. Numer. Method...
summary:We consider finite element approximations of a second order elliptic problem on a bounded po...
AbstractIn this paper, we discuss with guaranteed a priori and a posteriori error estimates of finit...
We obtain a fully computable a posteriori error bound on the broken energy norm of the error in the ...
We give an overview of our recent progress in developing a framework for the derivation of fully com...
International audienceThis paper deals with the verification of simulations performed using the fini...
Kyushu University 21st Century COE Program Development of Dynamic Mathematics with High Functionalit...
The values of constants appearing in error estimates of approximations by finite element methods pla...
The classic Lp -based estimates for solutions of elliptic partial differential equations satisfying ...
The classic Lp-based estimates for solutions of elliptic partial differential equa-tions satisfying ...
We obtain fully computable a posteriori error bounds on the broken energy seminorm and discontinuous...
Abstract. We obtain a computable a posteriori error bound on the broken energy norm of the error in ...
AbstractWe present guaranteed and computable both sided error bounds for the discontinuous Galerkin ...
International audienceThis paper is a revisit of the work [Ladevèze and Pelle, Int. J. Numer. Method...
summary:We consider finite element approximations of a second order elliptic problem on a bounded po...