AbstractIn this work we derive and analyze a posteriori error estimators for low-order nonconforming finite element methods of the linear elasticity problem on both triangular and quadrilateral meshes, with hanging nodes allowed for local mesh refinement. First, it is shown that equilibrated Neumann data on interelement boundaries are simply given by the local weak residuals of the numerical solution. The first error estimator is then obtained by applying the equilibrated residual method with this set of Neumann data. From this implicit estimator we also derive two explicit error estimators, one of which is similar to the one proposed by Dörfler and Ainsworth (2005) [24] for the Stokes problem. It is established that all these error estimat...
We obtain fully computable a posteriori error estimators for the energy norm of the error in second-...
An a posteriori error estimator is obtained for a nonconforming finite element approximation of a li...
We derive a posteriori error estimates for nonconforming discretizations of Poisson's and Stokes' eq...
AbstractIn this work we derive and analyze a posteriori error estimators for low-order nonconforming...
In the dissertation, we study the error estimation in finite element method for linear elasticity. I...
Residual-based a posteriori error estimates were derived within one unifying framework for lowest-or...
Residual-based a posteriori error estimates were derived within one unifying framework for lowest-or...
The equilibrated residual method for a posteriori error estimation is extended to nonconforming fini...
This paper is devoted to the construction of a posteriori error estimators for problems in linear el...
We derive an a posteriori error estimator giving a computable upper bound on the error in the energy...
Abstract. An a posteriori error estimator is obtained for a nonconforming finite element approximati...
Recently a refined approach to error control in finite element (FE) discretisations has been propose...
Abstract. We consider the augmented mixed finite element methods introduced in [5] and [6] for the l...
International audienceWe present and analyze a new a posteriori error estimator for lowest order con...
A new technique for a posteriori error control and adaptive mesh design is presented for finite elem...
We obtain fully computable a posteriori error estimators for the energy norm of the error in second-...
An a posteriori error estimator is obtained for a nonconforming finite element approximation of a li...
We derive a posteriori error estimates for nonconforming discretizations of Poisson's and Stokes' eq...
AbstractIn this work we derive and analyze a posteriori error estimators for low-order nonconforming...
In the dissertation, we study the error estimation in finite element method for linear elasticity. I...
Residual-based a posteriori error estimates were derived within one unifying framework for lowest-or...
Residual-based a posteriori error estimates were derived within one unifying framework for lowest-or...
The equilibrated residual method for a posteriori error estimation is extended to nonconforming fini...
This paper is devoted to the construction of a posteriori error estimators for problems in linear el...
We derive an a posteriori error estimator giving a computable upper bound on the error in the energy...
Abstract. An a posteriori error estimator is obtained for a nonconforming finite element approximati...
Recently a refined approach to error control in finite element (FE) discretisations has been propose...
Abstract. We consider the augmented mixed finite element methods introduced in [5] and [6] for the l...
International audienceWe present and analyze a new a posteriori error estimator for lowest order con...
A new technique for a posteriori error control and adaptive mesh design is presented for finite elem...
We obtain fully computable a posteriori error estimators for the energy norm of the error in second-...
An a posteriori error estimator is obtained for a nonconforming finite element approximation of a li...
We derive a posteriori error estimates for nonconforming discretizations of Poisson's and Stokes' eq...