International audienceThis study presents a novel goal-oriented error estimate for the nonlinear shallow water equations solved using a mixed discontinuous/continuous Galerkin approach. This error estimator takes account of the discontinuities in the discrete solu-tion and is used to drive two metric-based mesh adaptation algorithms: one which yields isotropic meshes and another which yields anisotropic meshes. An implementation of these goal-oriented mesh adaptation algorithms is described, including a method for approximating the adjoint error term which arises in the error estimate. Results are presented for simulations of two model tidal farm configurations computed using the Thetis coastal ocean model (Kärnä et al. in Geosci Model Dev ...
Purpose: To examine the accuracy and sensitivity of tidal array performance assessment by numerical ...
Abstract. This study brings an adaptive mesh strategy applied to the numerical simulation of free-su...
Given a partial differential equation (PDE), goal-oriented error estimation allows us to understand ...
This study presents a novel goal-oriented error estimate for the nonlinear shallow water equations s...
We estimate the discretization error of time-dependent goals that are calculated from a numerical mo...
The aim of this paper is to propose an effective anisotropic mesh adaptation procedure for the solut...
Flow in the world's oceans occurs at a wide range of spatial scales, from a fraction of a metre up t...
This thesis presents goal-based error measures and applies them, via appropriate metric tensors, to ...
Original article can be found at: www.sciencedirect.com Copyright Elsevier [Full text of this articl...
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...
The use of unstructured grids for the numerical approximation of partial differential equations of ...
We consider metric-based mesh adaptation methods for steady-state partial differential equations (PD...
In this paper it is shown how themesh adaption technique can be exploited for the numerical simulat...
AbstractGoal oriented dual weight error estimation has been used in context of computational fluid d...
Purpose: To examine the accuracy and sensitivity of tidal array performance assessment by numerical ...
Abstract. This study brings an adaptive mesh strategy applied to the numerical simulation of free-su...
Given a partial differential equation (PDE), goal-oriented error estimation allows us to understand ...
This study presents a novel goal-oriented error estimate for the nonlinear shallow water equations s...
We estimate the discretization error of time-dependent goals that are calculated from a numerical mo...
The aim of this paper is to propose an effective anisotropic mesh adaptation procedure for the solut...
Flow in the world's oceans occurs at a wide range of spatial scales, from a fraction of a metre up t...
This thesis presents goal-based error measures and applies them, via appropriate metric tensors, to ...
Original article can be found at: www.sciencedirect.com Copyright Elsevier [Full text of this articl...
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...
The use of unstructured grids for the numerical approximation of partial differential equations of ...
We consider metric-based mesh adaptation methods for steady-state partial differential equations (PD...
In this paper it is shown how themesh adaption technique can be exploited for the numerical simulat...
AbstractGoal oriented dual weight error estimation has been used in context of computational fluid d...
Purpose: To examine the accuracy and sensitivity of tidal array performance assessment by numerical ...
Abstract. This study brings an adaptive mesh strategy applied to the numerical simulation of free-su...
Given a partial differential equation (PDE), goal-oriented error estimation allows us to understand ...