This paper presents a second-order accurate adaptive Godunov method for two-dimensional (2D) compressible multicomponent flows, which is an extension of the previous adaptive moving mesh method of Tang et al. (SIAM J. Numer. Anal. 41:487-515, 2003) to unstructured triangular meshes in place of the structured quadrangular meshes. The current algorithm solves the governing equations of 2D multicomponent flows and the finite-volume approximations of the mesh equations by a fully conservative, second-order accurate Godunov scheme and a relaxed Jacobi-type iteration, respectively. The geometry-based conservative interpolation is employed to remap the solutions from the old mesh to the newly resulting mesh, and a simple slope limiter and a new mo...
During the development of computational methods that solve time dependent shock hydrodynamic proble...
International audienceWe present in this paper a new approximate Godunov solver called WFRoe which a...
We present a novel method for simulating compressible flow on a multitude of Cartesian grids that ca...
A two-step second order extension of Godunov scheme is presented. The two-step algorithm, which is o...
We present a numerical method for solving the multifluid equations of gas dynamics using an operator...
This paper presents a second-order accurate adaptive generalized Riemann problem (GRP) scheme for on...
A numerical method is described for inviscid, compressible, multi-material flow in two space dimensi...
Abstract. In this work, a detailed description for an efficient adaptive mesh redistribution algo-ri...
A second order Shock-Adaptive Godunov-type scheme for solving the steady Euler equations in Orthogon...
This paper considers the Riemann problem and an associated Godunov method for a model of compressibl...
Abstract: This preprint deals with the elaboration of the algorithm for multicomponent gas...
Abstract. Compressible multiphase models have been studied for a long time inspired on different app...
An adaptive ghost fluid finite volume method is developed for one- and two-dimensional compressible ...
The objectives of this project were to develop computationally efficient numerical methods for model...
Compressible multiphase models have been studied for a long time inspired on different applications ...
During the development of computational methods that solve time dependent shock hydrodynamic proble...
International audienceWe present in this paper a new approximate Godunov solver called WFRoe which a...
We present a novel method for simulating compressible flow on a multitude of Cartesian grids that ca...
A two-step second order extension of Godunov scheme is presented. The two-step algorithm, which is o...
We present a numerical method for solving the multifluid equations of gas dynamics using an operator...
This paper presents a second-order accurate adaptive generalized Riemann problem (GRP) scheme for on...
A numerical method is described for inviscid, compressible, multi-material flow in two space dimensi...
Abstract. In this work, a detailed description for an efficient adaptive mesh redistribution algo-ri...
A second order Shock-Adaptive Godunov-type scheme for solving the steady Euler equations in Orthogon...
This paper considers the Riemann problem and an associated Godunov method for a model of compressibl...
Abstract: This preprint deals with the elaboration of the algorithm for multicomponent gas...
Abstract. Compressible multiphase models have been studied for a long time inspired on different app...
An adaptive ghost fluid finite volume method is developed for one- and two-dimensional compressible ...
The objectives of this project were to develop computationally efficient numerical methods for model...
Compressible multiphase models have been studied for a long time inspired on different applications ...
During the development of computational methods that solve time dependent shock hydrodynamic proble...
International audienceWe present in this paper a new approximate Godunov solver called WFRoe which a...
We present a novel method for simulating compressible flow on a multitude of Cartesian grids that ca...