Journal ArticleThe goal of efficient and robust error control, through local mesh adaptation in the computational solution of partial differential equations, is predicated on the ability to identify in an a posteriori way those localized regions whose refinement will lead to the most significant reductions in the error. The development of a posteriori error estimation schemes and of a refinement infrastructure both facilitate this goal, however they are incomplete in the sense that they do not provide an answer as to where the maximal impact of refinement may be gained or what type of refinement - elemental partitioning (h-refinement) or polynomial enrichment (p-refinement) - will best lead to that gain. In essence, one also requires knowle...
We present a general paradigm for a posteriori error control and adaptive mesh design in finite elem...
AbstractIn this paper an adjoint- (or sensitivity-) based error measure is formulated which measures...
AbstractWe present a general method for error control and mesh adaptivity in Galerkin finite element...
Most indicators used for automatic grid refinement are suboptimal, in the sense that they do not rea...
International audienceWe propose a new practical adaptive refinement strategy for $hp$-finite elemen...
a b s t r a c t The use of (a posteriori) error estimates is a fundamental tool in the application o...
Most indicators used for automatic grid refinement are suboptimal, in the sense that they do not re...
The use of adjoint error estimation techniques is described for a model problem that is a simplified...
PhDThe adjoint method in computational fluid dynamics (CFD) made shape optimisation affordable. Howe...
Abstract. In the hp-adaptive version of the finite element method for solving partial differential e...
Two efficiency-based grid refinement strategies are investigated for adaptive finite element soluti...
The development of adaptive mesh refinement capabilities in the field of computational fluid dynamic...
This study seeks to reduce the degree of uncertainty that often arises in computational fluid dynami...
This paper presents a formulation for the obtainment of the sensitivity analysis of a point wise err...
We consider the a posteriori error analysis and hp-adaptation strategies for hp-version interior pen...
We present a general paradigm for a posteriori error control and adaptive mesh design in finite elem...
AbstractIn this paper an adjoint- (or sensitivity-) based error measure is formulated which measures...
AbstractWe present a general method for error control and mesh adaptivity in Galerkin finite element...
Most indicators used for automatic grid refinement are suboptimal, in the sense that they do not rea...
International audienceWe propose a new practical adaptive refinement strategy for $hp$-finite elemen...
a b s t r a c t The use of (a posteriori) error estimates is a fundamental tool in the application o...
Most indicators used for automatic grid refinement are suboptimal, in the sense that they do not re...
The use of adjoint error estimation techniques is described for a model problem that is a simplified...
PhDThe adjoint method in computational fluid dynamics (CFD) made shape optimisation affordable. Howe...
Abstract. In the hp-adaptive version of the finite element method for solving partial differential e...
Two efficiency-based grid refinement strategies are investigated for adaptive finite element soluti...
The development of adaptive mesh refinement capabilities in the field of computational fluid dynamic...
This study seeks to reduce the degree of uncertainty that often arises in computational fluid dynami...
This paper presents a formulation for the obtainment of the sensitivity analysis of a point wise err...
We consider the a posteriori error analysis and hp-adaptation strategies for hp-version interior pen...
We present a general paradigm for a posteriori error control and adaptive mesh design in finite elem...
AbstractIn this paper an adjoint- (or sensitivity-) based error measure is formulated which measures...
AbstractWe present a general method for error control and mesh adaptivity in Galerkin finite element...