An adaptive Finite Point Method (FPM) for solving shallow water problems is presented. The numerical methodology we propose, which is based on weighted‐least squares approximations on clouds of points, adopts an upwind‐biased discretization for dealing with the convective terms in the governing equations. The viscous and source terms are discretized in a pointwise manner and the semi‐discrete equations are integrated explicitly in time by means of a multi‐stage scheme. Moreover, with the aim of exploiting meshless capabilities, an adaptive h‐refinement technique is coupled to the described flow solver. The success of this approach in solving typical shallow water flows is illustrated by means of several numerical examples and special e...
The Finite Point Method (FPM) is a meshless technique which is based on both, a Weighted Least-Squar...
In this thesis we implement the Shallow Water equations (SWEs) on unstructured grids in order to sim...
The shallow water equations are a commonly accepted approximation governing tsunami propagation. Num...
An adaptive Finite Point Method (FPM) for solving shallow water problems is presented. The numerical...
AbstractWe present a new finite volume method for the numerical solution of shallow water equations ...
Cette thèse se fera dans le cadre des activités de l’équipe Inria CARDAMOM en matière de méthodes ad...
In this paper it is shown how themesh adaption technique can be exploited for the numerical simulat...
Water flows can be modelled mathematically and one available model is the shallow water equations. T...
A simple and accurate projection finite volume method is developed for solving shallow water equatio...
A second-order accurate, Godunov-type upwind finite volume method on dynamic refinement grids is dev...
The use of unstructured grids for the numerical approximation of partial differential equations of ...
The finite point method (FPM) is a meshless technique, which is based on both, a weighted least‐squa...
The Shallow Water Equations model the fluid dynamics of deep ocean flow, and are used to simulate ti...
Mesh adaptation techniques are commonly coupled with the numerical schemes in an attempt to improve ...
The shallow-water equations (SWE), derived from the incompressible Navier-Stokes equations using the...
The Finite Point Method (FPM) is a meshless technique which is based on both, a Weighted Least-Squar...
In this thesis we implement the Shallow Water equations (SWEs) on unstructured grids in order to sim...
The shallow water equations are a commonly accepted approximation governing tsunami propagation. Num...
An adaptive Finite Point Method (FPM) for solving shallow water problems is presented. The numerical...
AbstractWe present a new finite volume method for the numerical solution of shallow water equations ...
Cette thèse se fera dans le cadre des activités de l’équipe Inria CARDAMOM en matière de méthodes ad...
In this paper it is shown how themesh adaption technique can be exploited for the numerical simulat...
Water flows can be modelled mathematically and one available model is the shallow water equations. T...
A simple and accurate projection finite volume method is developed for solving shallow water equatio...
A second-order accurate, Godunov-type upwind finite volume method on dynamic refinement grids is dev...
The use of unstructured grids for the numerical approximation of partial differential equations of ...
The finite point method (FPM) is a meshless technique, which is based on both, a weighted least‐squa...
The Shallow Water Equations model the fluid dynamics of deep ocean flow, and are used to simulate ti...
Mesh adaptation techniques are commonly coupled with the numerical schemes in an attempt to improve ...
The shallow-water equations (SWE), derived from the incompressible Navier-Stokes equations using the...
The Finite Point Method (FPM) is a meshless technique which is based on both, a Weighted Least-Squar...
In this thesis we implement the Shallow Water equations (SWEs) on unstructured grids in order to sim...
The shallow water equations are a commonly accepted approximation governing tsunami propagation. Num...