Add to ORKGThe equilibrated residual method and the method of hypercircle are popular methods for a posteriori error estimation for linear elliptic problems. Both these methods are intended to produce guaranteed upper bounds of the energy norm of the error, but the equilibrated residual method is guaranteed only theoretically. The disadvantage of the hypercircle method is its globality, hence slowness. The combination of these two methods leads to local, hence fast, and guaranteed a posteriori error estimator
The equilibrated residual method for a posteriori error estimation is extended to nonconforming fini...
The equilibrated residual method for a posteriori error estimation is extended to nonconforming fini...
AbstractWe analyse three different a posteriori error estimators for elliptic partial differential e...
summary:The equilibrated residual method and the method of hypercircle are popular methods for a pos...
linear elliptic problem. Abstract. The error of the finite element solution of linear elliptic probl...
A new approach, based on the combination of the equilibrated residual method and the method of hyper...
A new approach, based on the combination of the equilibrated residual method and the method of hyper...
summary:The equilibrated residual method and the method of hypercircle are popular methods for a pos...
summary:The equilibrated residual method and the method of hypercircle are popular methods for a pos...
The error of the finite element solution of linear elliptic problems can be estimated a posteriori b...
A reliable and efficient residual based a posteriori error estimator is constructed for a weakly ove...
summary:Karátson and Korotov developed a sharp upper global a posteriori error estimator for a large...
summary:Karátson and Korotov developed a sharp upper global a posteriori error estimator for a large...
summary:Karátson and Korotov developed a sharp upper global a posteriori error estimator for a large...
summary:The paper is devoted to the problem of reliable control of accuracy of approximate solutions...
The equilibrated residual method for a posteriori error estimation is extended to nonconforming fini...
The equilibrated residual method for a posteriori error estimation is extended to nonconforming fini...
AbstractWe analyse three different a posteriori error estimators for elliptic partial differential e...
summary:The equilibrated residual method and the method of hypercircle are popular methods for a pos...
linear elliptic problem. Abstract. The error of the finite element solution of linear elliptic probl...
A new approach, based on the combination of the equilibrated residual method and the method of hyper...
A new approach, based on the combination of the equilibrated residual method and the method of hyper...
summary:The equilibrated residual method and the method of hypercircle are popular methods for a pos...
summary:The equilibrated residual method and the method of hypercircle are popular methods for a pos...
The error of the finite element solution of linear elliptic problems can be estimated a posteriori b...
A reliable and efficient residual based a posteriori error estimator is constructed for a weakly ove...
summary:Karátson and Korotov developed a sharp upper global a posteriori error estimator for a large...
summary:Karátson and Korotov developed a sharp upper global a posteriori error estimator for a large...
summary:Karátson and Korotov developed a sharp upper global a posteriori error estimator for a large...
summary:The paper is devoted to the problem of reliable control of accuracy of approximate solutions...
The equilibrated residual method for a posteriori error estimation is extended to nonconforming fini...
The equilibrated residual method for a posteriori error estimation is extended to nonconforming fini...
AbstractWe analyse three different a posteriori error estimators for elliptic partial differential e...