© 2014. In this paper, we generalize the maximum-principle-preserving (MPP) flux limiting technique developed by Xu (2013) [20] to a class of high order finite volume weighted essentially non-oscillatory (WENO) schemes for scalar conservation laws and the compressible Euler system on unstructured meshes in one and two dimensions. The key idea of this parameterized limiting technique is to limit the high order numerical flux with a first order flux which preserves the MPP or positivity-preserving (PP) property. The main purpose of this paper is to investigate the flux limiting approach with high order finite volume method on unstructured meshes which are often needed for solving some important problems on irregular domains. Truncation error ...
An assessment of two numerical formulations for high-order reconstruction on unstructured triangular...
We present a novel family of arbitrary high order accurate central Weighted ENO (CWENO) finite volum...
In this paper, we will extend the strict maximum principle preserving flux limiting technique develo...
In Xu (2013) [14], a class of parametrized flux limiters is developed for high order finite differen...
Recent advances in finite-difference WENO schemes for hyperbolic conservation laws have resulted in ...
In this paper a relaxed formulation of the a posteriori Multi-dimensional Optimal Order Detection (M...
The solution of the non-hydrostatic compressible Euler equations using Weighted Essentially Non-Osci...
Os datos relativos aos resultados deste artigo poden descargarse desde https://doi.org/10.17862/cran...
© 2015 Society for Industrial and Applied Mathematics. In this paper, we utilize the maximum-princip...
The paper discusses finite volume WENO reconstruction applied to simulation of compressible 3D Euler...
In this dissertation, several high-order numerical methods for solving time dependent problems are s...
International audienceIn this paper, we investigate the coupling of the Multi-dimensional Optimal Or...
In [J. Qiu, C.-W. Shu, Runge-Kutta discontinuous Galerkin method using WENO limiters, SIAM Journal o...
In this paper we present a new family of high order accurate Arbitrary-Lagrangian-Eulerian (ALE) one...
In this paper, we propose the parametrized maximum principle preserving (MPP) flux limiter, original...
An assessment of two numerical formulations for high-order reconstruction on unstructured triangular...
We present a novel family of arbitrary high order accurate central Weighted ENO (CWENO) finite volum...
In this paper, we will extend the strict maximum principle preserving flux limiting technique develo...
In Xu (2013) [14], a class of parametrized flux limiters is developed for high order finite differen...
Recent advances in finite-difference WENO schemes for hyperbolic conservation laws have resulted in ...
In this paper a relaxed formulation of the a posteriori Multi-dimensional Optimal Order Detection (M...
The solution of the non-hydrostatic compressible Euler equations using Weighted Essentially Non-Osci...
Os datos relativos aos resultados deste artigo poden descargarse desde https://doi.org/10.17862/cran...
© 2015 Society for Industrial and Applied Mathematics. In this paper, we utilize the maximum-princip...
The paper discusses finite volume WENO reconstruction applied to simulation of compressible 3D Euler...
In this dissertation, several high-order numerical methods for solving time dependent problems are s...
International audienceIn this paper, we investigate the coupling of the Multi-dimensional Optimal Or...
In [J. Qiu, C.-W. Shu, Runge-Kutta discontinuous Galerkin method using WENO limiters, SIAM Journal o...
In this paper we present a new family of high order accurate Arbitrary-Lagrangian-Eulerian (ALE) one...
In this paper, we propose the parametrized maximum principle preserving (MPP) flux limiter, original...
An assessment of two numerical formulations for high-order reconstruction on unstructured triangular...
We present a novel family of arbitrary high order accurate central Weighted ENO (CWENO) finite volum...
In this paper, we will extend the strict maximum principle preserving flux limiting technique develo...