In this paper we develop function-based a posteriori error estimators for the solution of linear second order elliptic problems considering hierarchical spline spaces for the Galerkin discretization. We obtain a global upper bound for the energy error over arbitrary hierarchical mesh configurations which simplifies the implementation of adaptive refinement strategies. The theory hinges on some weighted Poincaré type inequalities where the B-spline basis functions are the weights appearing in the norms. Such inequalities are derived following the lines in (Veeser and Verfürth, 2009), where the case of standard finite elements is considered. Additionally, we present numerical experiments that show the efficiency of the error estimators indepe...
We present a new residual-type energy-norm a posteriori error analysis for interior penalty disconti...
n this article we propose two simple a posteriori error estimators for solving second order elliptic...
We present and analyze novel hierarchical a posteriori error estimates for self-adjoint elliptic obs...
This work focuses on the development of a posteriori error estimates for fourth-order, elliptic, par...
We present an a posteriori error estimate of hierarchical type for the mimetic discretization of ell...
We present an a posteriori error estimate of hierarchical type for the mimetic discretization of ell...
This work focuses on the development of a posteriori error estimates for fourth-order, elliptic, par...
AbstractIsogeometric analysis using NURBS (Non-Uniform Rational B-Splines) as basis functions gives ...
Abstract. We present an a posteriori error estimate of hierarchical type for the mimetic dis-cretiza...
We derive hierarchical a posteriori error estimates for elliptic variational inequalities. The evalu...
We consider an adaptive isogeometric method (AIGM) based on (truncated) hierarchical B-splines and c...
[Received on xx September 2006] We develop the a-posteriori error analysis of hp-version interior-pe...
We develop the a-posteriori error analysis of hp-version interior-penalty discontinuous Galerkin fin...
We treat numerical simulations on exact geometries by using a discontinuous Galerkin scheme with B-s...
We present a hierarchical a posteriori error analysis for the minimum value of the energy functional...
We present a new residual-type energy-norm a posteriori error analysis for interior penalty disconti...
n this article we propose two simple a posteriori error estimators for solving second order elliptic...
We present and analyze novel hierarchical a posteriori error estimates for self-adjoint elliptic obs...
This work focuses on the development of a posteriori error estimates for fourth-order, elliptic, par...
We present an a posteriori error estimate of hierarchical type for the mimetic discretization of ell...
We present an a posteriori error estimate of hierarchical type for the mimetic discretization of ell...
This work focuses on the development of a posteriori error estimates for fourth-order, elliptic, par...
AbstractIsogeometric analysis using NURBS (Non-Uniform Rational B-Splines) as basis functions gives ...
Abstract. We present an a posteriori error estimate of hierarchical type for the mimetic dis-cretiza...
We derive hierarchical a posteriori error estimates for elliptic variational inequalities. The evalu...
We consider an adaptive isogeometric method (AIGM) based on (truncated) hierarchical B-splines and c...
[Received on xx September 2006] We develop the a-posteriori error analysis of hp-version interior-pe...
We develop the a-posteriori error analysis of hp-version interior-penalty discontinuous Galerkin fin...
We treat numerical simulations on exact geometries by using a discontinuous Galerkin scheme with B-s...
We present a hierarchical a posteriori error analysis for the minimum value of the energy functional...
We present a new residual-type energy-norm a posteriori error analysis for interior penalty disconti...
n this article we propose two simple a posteriori error estimators for solving second order elliptic...
We present and analyze novel hierarchical a posteriori error estimates for self-adjoint elliptic obs...