An Eulerian numerical scheme is proposed for the solution of the two-dimensional pollutant transport equation coupled with hydrodynamic shallow water equations. The model is based on a second-order approximate Riemann solver used to integrate the advective part of the equations on non uniform quadrangular grids. To reduce the numerical diffusion that arises in pure second order schemes, a fifth order one-dimensional WENO reconstruction is introduced. The one-dimensional WENO reconstruction applied to two-dimensional problems does not increase the overall convergence rate, nevertheless it leads to a sensible improvement of the results in terms of numerical diffusion in comparison to pure second order schemes. Besides, the proposed scheme com...
International audiencePollutant transport by shallow water flows on nonflat topography is presented ...
A third-order accurate numerical method for the 2D shallow water equations, inclusive of the convect...
The Method of Transport was originally developed for the Euler equation in 1993 by M. Fey. He introd...
Prepared under the support of Northeast Utilities Service Co., Hartford, Connecticut and New England...
International audienceIn this work, a recent residual distribution scheme and a second-order finite ...
A numerical method for the solution of the two-dimensional, unsteady, transport equation is formulat...
We present a hybrid numerical method for computing the propagation of a diffusing passive pollutant ...
A truly two-dimensional scheme based on a finite volume discretization on structured meshes will be ...
Summarization: We present a numerical method based on finite difference relaxation approximations fo...
18 Pags.- 8 Figs.- 3 Tabls.The 2D solute transport equation can be incorporated into the 2D shallow ...
Pollutant transport by shallow water flows on non-flat topography is presented and numerically solve...
Abstract: A new method for solving the passive scalar transport equation in the framework ...
The aim of this paper is to present a finite volume kinetic method to compute the transport of a pas...
AbstractUnderstanding the space-time dynamics of pollutant transport remains an essential impediment...
AbstractIn the present paper, a finite element model is developed based on a semi-discrete Streamlin...
International audiencePollutant transport by shallow water flows on nonflat topography is presented ...
A third-order accurate numerical method for the 2D shallow water equations, inclusive of the convect...
The Method of Transport was originally developed for the Euler equation in 1993 by M. Fey. He introd...
Prepared under the support of Northeast Utilities Service Co., Hartford, Connecticut and New England...
International audienceIn this work, a recent residual distribution scheme and a second-order finite ...
A numerical method for the solution of the two-dimensional, unsteady, transport equation is formulat...
We present a hybrid numerical method for computing the propagation of a diffusing passive pollutant ...
A truly two-dimensional scheme based on a finite volume discretization on structured meshes will be ...
Summarization: We present a numerical method based on finite difference relaxation approximations fo...
18 Pags.- 8 Figs.- 3 Tabls.The 2D solute transport equation can be incorporated into the 2D shallow ...
Pollutant transport by shallow water flows on non-flat topography is presented and numerically solve...
Abstract: A new method for solving the passive scalar transport equation in the framework ...
The aim of this paper is to present a finite volume kinetic method to compute the transport of a pas...
AbstractUnderstanding the space-time dynamics of pollutant transport remains an essential impediment...
AbstractIn the present paper, a finite element model is developed based on a semi-discrete Streamlin...
International audiencePollutant transport by shallow water flows on nonflat topography is presented ...
A third-order accurate numerical method for the 2D shallow water equations, inclusive of the convect...
The Method of Transport was originally developed for the Euler equation in 1993 by M. Fey. He introd...