We consider metric-based mesh adaptation methods for steady-state partial differential equations (PDEs), solved using the finite element method in Firedrake. In this work, a number of mesh-adaptive methods are implemented within this framework, each enabling accurate approximation of a scalar quantity of interest (QoI). Through the QoI we define adjoint equations, with which we may gain understanding of its sensitivities to aspects of the PDE solution. Dual weighted residual type error estimation techniques are utilised in order to enable a goal-oriented strategy. Isotropic and anisotropic approaches are considered, both of which are able to achieve the same relative error in approximating the QoI as with uniform refinement, but using fewer...
The contribution of this paper is twofold. Firstly, moving from the very well-known dual-weighted re...
Abstract. A new anisotropic mesh adaptation strategy for finite element solution of elliptic differe...
We present different metrics derived from a posteriori error estimates for the Pois-son problem and ...
This paper applies metric-based mesh adaptation methods to advection-dominated tracer transport mode...
This paper applies metric-based mesh adaptation methods to advection-dominated tracer transport mode...
Mesh adaptation can be a very powerful tool for improving the accuracy and/or efficiency of simulati...
The aim of this paper is to propose an effective anisotropic mesh adaptation procedure for the solut...
Accurate numerical simulation of reaction-diffusion systems can come with a high cost. A system may ...
We present a new recovery-based anisotropic error estimator for discontinuous Galerkin finite elemen...
When the finite element method is used to solve boundary value problems, the corresponding finite el...
Abstract. A new anisotropic mesh adaptation strategy for finite element solution of el-liptic differ...
International audienceIn this work, we combine the use of the Streamline Upwind Petrov-Galerkin (SUP...
This study presents a novel goal-oriented error estimate for the nonlinear shallow water equations s...
International audienceWe present a novel formulation for the mesh adaptation of the approximation of...
Existe sous forme de présentation (cf. voir aussi)International audienceKeywords : Fluid-structure i...
The contribution of this paper is twofold. Firstly, moving from the very well-known dual-weighted re...
Abstract. A new anisotropic mesh adaptation strategy for finite element solution of elliptic differe...
We present different metrics derived from a posteriori error estimates for the Pois-son problem and ...
This paper applies metric-based mesh adaptation methods to advection-dominated tracer transport mode...
This paper applies metric-based mesh adaptation methods to advection-dominated tracer transport mode...
Mesh adaptation can be a very powerful tool for improving the accuracy and/or efficiency of simulati...
The aim of this paper is to propose an effective anisotropic mesh adaptation procedure for the solut...
Accurate numerical simulation of reaction-diffusion systems can come with a high cost. A system may ...
We present a new recovery-based anisotropic error estimator for discontinuous Galerkin finite elemen...
When the finite element method is used to solve boundary value problems, the corresponding finite el...
Abstract. A new anisotropic mesh adaptation strategy for finite element solution of el-liptic differ...
International audienceIn this work, we combine the use of the Streamline Upwind Petrov-Galerkin (SUP...
This study presents a novel goal-oriented error estimate for the nonlinear shallow water equations s...
International audienceWe present a novel formulation for the mesh adaptation of the approximation of...
Existe sous forme de présentation (cf. voir aussi)International audienceKeywords : Fluid-structure i...
The contribution of this paper is twofold. Firstly, moving from the very well-known dual-weighted re...
Abstract. A new anisotropic mesh adaptation strategy for finite element solution of elliptic differe...
We present different metrics derived from a posteriori error estimates for the Pois-son problem and ...