We obtain a fully computable a posteriori error bound on the broken energy norm of the error in the nonconforming finite element approximation on triangles of arbitrary order of a linear second order elliptic problem with variable permeability. The estimator is completely free of unknown constants and provides a guaranteed numerical bound on the broken energy norm of the error. This estimator is shown to be efficient in the sense that it also provides a lower bound for the broken energy norm of the error up to a constant and higher order data oscillation term
AbstractWe present a method for computing a posteriori error bounds for piecewise linear nonconformi...
We develop and compare a number of alternative approaches to obtain guaranteed and fully computable ...
We propose computable a posteriori error estimates for a second order nonconforming finite element a...
We obtain a fully computable a posteriori error bound on the broken energy norm of the error in the ...
Abstract. We obtain a computable a posteriori error bound on the broken energy norm of the error in ...
We obtain a computable a posteriori error bound on the broken energy norm of the error in the Fortin...
We obtain fully computable constant free a posteriori error bounds on the broken energy seminorm of ...
We obtain fully computable a posteriori error bounds on the broken energy seminorm and discontinuous...
We obtain fully computable constant free a posteriori error bounds on the broken energy seminorm and...
We obtain fully computable a posteriori error estimators for the energy norm of the error in second-...
For a nonconforming finite element approximation of an elliptic model problem, we propose a posterio...
AbstractIn this paper, we discuss with guaranteed a priori and a posteriori error estimates of finit...
The equilibrated residual method for a posteriori error estimation is extended to nonconforming fini...
AbstractWe present a method for computing a posteriori error bounds for piecewise linear nonconformi...
We develop and compare a number of alternative approaches to obtain guaranteed and fully computable ...
We propose computable a posteriori error estimates for a second order nonconforming finite element a...
We obtain a fully computable a posteriori error bound on the broken energy norm of the error in the ...
Abstract. We obtain a computable a posteriori error bound on the broken energy norm of the error in ...
We obtain a computable a posteriori error bound on the broken energy norm of the error in the Fortin...
We obtain fully computable constant free a posteriori error bounds on the broken energy seminorm of ...
We obtain fully computable a posteriori error bounds on the broken energy seminorm and discontinuous...
We obtain fully computable constant free a posteriori error bounds on the broken energy seminorm and...
We obtain fully computable a posteriori error estimators for the energy norm of the error in second-...
For a nonconforming finite element approximation of an elliptic model problem, we propose a posterio...
AbstractIn this paper, we discuss with guaranteed a priori and a posteriori error estimates of finit...
The equilibrated residual method for a posteriori error estimation is extended to nonconforming fini...
AbstractWe present a method for computing a posteriori error bounds for piecewise linear nonconformi...
We develop and compare a number of alternative approaches to obtain guaranteed and fully computable ...
We propose computable a posteriori error estimates for a second order nonconforming finite element a...