This paper examines the behavior of flux and slope limiters on non-uniform grids in multiple dimensions. We note that on non-uniform grids the scalar formulation in standard use today sacrifices k-exactness, even for linear solutions, impacting both accuracy and convergence. We rewrite some well-known limiters in a n way to highlight their underlying symmetry, and use this to examine both traditional and novel limiter formulations. A consistent method of handling stretched meshes is developed, as is a new directional formulation in multiple dimensions for irregular grids. Results are presented demonstrating improved accuracy and convergence using a combination of model problems and complex three-dimensional examples
In this paper, we extend the idea of MLP to three-dimensional space and present the multi-dimension...
For the finite volume method, the reconstruction step is employed to obtain the states for the calcu...
A new approach to the derivation of local extremum diminishing finite element schemes is presented. ...
Abstract. In this paper we develop a new limiter for linear reconstruction on non-coordinate-aligned...
The present paper deals with the continuous work of extending multi-dimensional limiting process (ML...
This paper deals with a robust, accurate and efficient multi-dimensional limiting strategy on three-...
The present paper deals with the continuous work of extending multi-dimensional limiting process (ML...
Many second-order accurate finite volume methods are based on the following 3 steps: 1. Construct a ...
The present paper deals with the continuous work of extending multi-dimensional limiting process (ML...
The present paper deals with an efficient and accurate limiting strategy for the multi-dimensional h...
Abstract. We analyze a general concept of limiters for a high order DG scheme written for a 1-D prob...
Despite emerging alternatives such as essentially nonoscillatory schemes, the use of slope limiters ...
Abstract: The limiter, saving high order of accuracy on smooth solutions obtained by RKDG ...
AbstractA new approach to slope limiting for discontinuous Galerkin methods on arbitrary meshes is i...
AbstractFor the finite volume method, the reconstruction step is employed to obtain the states for t...
In this paper, we extend the idea of MLP to three-dimensional space and present the multi-dimension...
For the finite volume method, the reconstruction step is employed to obtain the states for the calcu...
A new approach to the derivation of local extremum diminishing finite element schemes is presented. ...
Abstract. In this paper we develop a new limiter for linear reconstruction on non-coordinate-aligned...
The present paper deals with the continuous work of extending multi-dimensional limiting process (ML...
This paper deals with a robust, accurate and efficient multi-dimensional limiting strategy on three-...
The present paper deals with the continuous work of extending multi-dimensional limiting process (ML...
Many second-order accurate finite volume methods are based on the following 3 steps: 1. Construct a ...
The present paper deals with the continuous work of extending multi-dimensional limiting process (ML...
The present paper deals with an efficient and accurate limiting strategy for the multi-dimensional h...
Abstract. We analyze a general concept of limiters for a high order DG scheme written for a 1-D prob...
Despite emerging alternatives such as essentially nonoscillatory schemes, the use of slope limiters ...
Abstract: The limiter, saving high order of accuracy on smooth solutions obtained by RKDG ...
AbstractA new approach to slope limiting for discontinuous Galerkin methods on arbitrary meshes is i...
AbstractFor the finite volume method, the reconstruction step is employed to obtain the states for t...
In this paper, we extend the idea of MLP to three-dimensional space and present the multi-dimension...
For the finite volume method, the reconstruction step is employed to obtain the states for the calcu...
A new approach to the derivation of local extremum diminishing finite element schemes is presented. ...