Add to ORKGIn this work we introduce an accurate solver for the Shallow Water equations with source terms. This scheme does not need any kind of entropy correction to avoid instabilities near critical points. The scheme also solves the non-homogeneous case, in such a way that all equilibria are computed at least with second order accuracy. We perform several tests for relevant flows showing the performance of our scheme
We present an energy/entropy stable and high order accurate finite difference method for solving the...
The shallow water equations (SWE) are a system of nonlinear hyperbolic partial differential equation...
International audienceThis work considers the numerical approximation of the shallow-water equations...
In this work we introduce an accurate solver for the Shallow Water Equations with source terms. This...
In this work we introduce an accurate solver for the Shallow Water Equations with source terms. This...
Extensions to the Roe and HLL method have been previously formulated in order to solve the Shallow W...
A well-designed numerical method for the shallow water equations (SWE) should ensure well-balancedne...
A numerical scheme for the entropy of the one dimensional shallow water wave equations is presented....
A numerical scheme for the entropy of the one dimensional shallow water wave equations is presented....
A numerical scheme for the entropy of the one dimensional shallow water wave equations is presented....
A numerical scheme for the entropy of the one dimensional shallow water wave equations is presented....
We consider the Saint-Venant system for shallow water flows, with nonflat bottom. It is a hyperbolic...
International audienceThis work considers the numerical approximation of the shallow-water equations...
International audienceThis work considers the numerical approximation of the shallow-water equations...
We propose an efficient numerical scheme for the resolution of a non-hydrostatic Saint-Venant type m...
We present an energy/entropy stable and high order accurate finite difference method for solving the...
The shallow water equations (SWE) are a system of nonlinear hyperbolic partial differential equation...
International audienceThis work considers the numerical approximation of the shallow-water equations...
In this work we introduce an accurate solver for the Shallow Water Equations with source terms. This...
In this work we introduce an accurate solver for the Shallow Water Equations with source terms. This...
Extensions to the Roe and HLL method have been previously formulated in order to solve the Shallow W...
A well-designed numerical method for the shallow water equations (SWE) should ensure well-balancedne...
A numerical scheme for the entropy of the one dimensional shallow water wave equations is presented....
A numerical scheme for the entropy of the one dimensional shallow water wave equations is presented....
A numerical scheme for the entropy of the one dimensional shallow water wave equations is presented....
A numerical scheme for the entropy of the one dimensional shallow water wave equations is presented....
We consider the Saint-Venant system for shallow water flows, with nonflat bottom. It is a hyperbolic...
International audienceThis work considers the numerical approximation of the shallow-water equations...
International audienceThis work considers the numerical approximation of the shallow-water equations...
We propose an efficient numerical scheme for the resolution of a non-hydrostatic Saint-Venant type m...
We present an energy/entropy stable and high order accurate finite difference method for solving the...
The shallow water equations (SWE) are a system of nonlinear hyperbolic partial differential equation...
International audienceThis work considers the numerical approximation of the shallow-water equations...