The defect of mass by actual schemes within the GME has motivated the implementation of a conservative semi-Lagrangian scheme on an icosahedral mesh. This scheme for the GME-mesh is unique. The properties are demonstrated by applying the new algorithm to typical test cases as they can be derived from the shallow water test suite. The results using corse grids show: this scheme is attractive for a climate version of the GME. Even for periods longer than those as specified in the SWE test suite, a defect of mass in the range of accuracy of the machine is obtained. The relative error results show that the order os accuracy of the proposed algorithm is two
Traditional semi-Lagrangian dynamical solvers are widely used in current global numerical weather pr...
It is the purpose of this paper to propose a standard test case suite for two-dimensional transport...
AbstractWith the inclusion of a scalable spectral-element-based version of the High-Order Method Mod...
A computationally efficient mass-conservative transport scheme over the sphere is proposed and teste...
The transport process is an important part of the research of fluid dynamics, especially when it com...
This article describes a 2D and 3D adaptive and mass conserving semi-Lagrangian advection scheme for...
A high accuracy of the numerical schemes used for advection of atmospheric constituents in climate m...
We describe the remapped particle-mesh advection method, a new mass-conserving method for solving th...
The cell-integrated semi-Lagrangian method, in which trajectories from the corner points of a grid c...
Abstract: A mass-conservative version of the semi-implicit semi-Lagrangian High-Resolution Limited A...
Semi-Lagrangian integration method combined with the method of characteristics is applied to the two...
A conservative, single-cell-based semi-Lagrangian transport model is proposed in this paper. Using m...
In this paper a number of distinct issues that are of concern in the construction of an Eulerian or ...
Abstract As an extension of a previous work considering a fully advective formulatio...
Global atmospheric circulation models (GCM) typically have three primary algorithmic components: col...
Traditional semi-Lagrangian dynamical solvers are widely used in current global numerical weather pr...
It is the purpose of this paper to propose a standard test case suite for two-dimensional transport...
AbstractWith the inclusion of a scalable spectral-element-based version of the High-Order Method Mod...
A computationally efficient mass-conservative transport scheme over the sphere is proposed and teste...
The transport process is an important part of the research of fluid dynamics, especially when it com...
This article describes a 2D and 3D adaptive and mass conserving semi-Lagrangian advection scheme for...
A high accuracy of the numerical schemes used for advection of atmospheric constituents in climate m...
We describe the remapped particle-mesh advection method, a new mass-conserving method for solving th...
The cell-integrated semi-Lagrangian method, in which trajectories from the corner points of a grid c...
Abstract: A mass-conservative version of the semi-implicit semi-Lagrangian High-Resolution Limited A...
Semi-Lagrangian integration method combined with the method of characteristics is applied to the two...
A conservative, single-cell-based semi-Lagrangian transport model is proposed in this paper. Using m...
In this paper a number of distinct issues that are of concern in the construction of an Eulerian or ...
Abstract As an extension of a previous work considering a fully advective formulatio...
Global atmospheric circulation models (GCM) typically have three primary algorithmic components: col...
Traditional semi-Lagrangian dynamical solvers are widely used in current global numerical weather pr...
It is the purpose of this paper to propose a standard test case suite for two-dimensional transport...
AbstractWith the inclusion of a scalable spectral-element-based version of the High-Order Method Mod...