A shock-capturing, finite volume implementation of recently proposed non-hydrostatic two-dimensional shallow water equations, is proposed. The discretization of the equations in conservation form implies the modification of the time derivative of the conserved variable, in the form of a mass/inertia matrix, and extra terms in the flux functions. The effect of this matrix is to slow down wave propagation in the presence of significant bottom slopes. The proposed model is first derived in conservation form using mass and momentum balance principles. Its finite volume implementation is then presented. The additional terms to the shallow water equations can be discretized very easily via a simple time-stepping procedure. Two application example...
A class of central unstaggered finite volume methods for approximating solutions of hyperbolic syste...
Finite volume methods have proven themselves a powerful tool for finding solutions to the shallow wa...
Abstract. In the present study we propose a modified version of the nonlinear shallow water (Saint-V...
A shock-capturing, finite volume implementation of recently proposed non-hydrostatic two-dimensional...
AbstractWe present a new finite volume method for the numerical solution of shallow water equations ...
Water flows can be modelled mathematically and one available model is the shallow water equations. T...
None foundThe high-order numerical solution of the non-linear shallow water equations is susceptible...
This paper describes the formulation, verification, and validation of a depth-integrated, non-hydros...
We extend a recently proposed 2D depth-integrated Finite Volume solver for the nonlinear shallow wa-...
A finite volume based numerical algorithm has been developed for the numerical solution of the syste...
Tsunami modelling commonly accepts the shallow-water system as governing equations where the major d...
In the present work we discuss a special class of conservation laws, the one-dimensional Shallow Wat...
Well balanced finite volume methods used to solve the shallow water wave equations are designed to p...
In the early 90’ the research institute Deltares began the development of a non-hydrostatic extensio...
In this paper the numerical modeling and simulation of 2D shallow water equations is discussed with ...
A class of central unstaggered finite volume methods for approximating solutions of hyperbolic syste...
Finite volume methods have proven themselves a powerful tool for finding solutions to the shallow wa...
Abstract. In the present study we propose a modified version of the nonlinear shallow water (Saint-V...
A shock-capturing, finite volume implementation of recently proposed non-hydrostatic two-dimensional...
AbstractWe present a new finite volume method for the numerical solution of shallow water equations ...
Water flows can be modelled mathematically and one available model is the shallow water equations. T...
None foundThe high-order numerical solution of the non-linear shallow water equations is susceptible...
This paper describes the formulation, verification, and validation of a depth-integrated, non-hydros...
We extend a recently proposed 2D depth-integrated Finite Volume solver for the nonlinear shallow wa-...
A finite volume based numerical algorithm has been developed for the numerical solution of the syste...
Tsunami modelling commonly accepts the shallow-water system as governing equations where the major d...
In the present work we discuss a special class of conservation laws, the one-dimensional Shallow Wat...
Well balanced finite volume methods used to solve the shallow water wave equations are designed to p...
In the early 90’ the research institute Deltares began the development of a non-hydrostatic extensio...
In this paper the numerical modeling and simulation of 2D shallow water equations is discussed with ...
A class of central unstaggered finite volume methods for approximating solutions of hyperbolic syste...
Finite volume methods have proven themselves a powerful tool for finding solutions to the shallow wa...
Abstract. In the present study we propose a modified version of the nonlinear shallow water (Saint-V...