Add to ORKGIn this paper the numerical modeling and simulation of 2D shallow water equations is discussed with the non-flat topography. The sets of these equations is solved by means of the Crank-Nicolson finite difference method with constant external body force and Darcy Weisbach equation is used for friction slope parameter. We have obtained the important results that, as soon as we start the time then Height evaluation function has the maximum amplitude wave length which is decreasing when the time increases. The numerical solution algorithm works well and enables to predict the water elevation and velocity at any instance and any location in the domain
We present a comparison of two discretization methods for the shallow water equations, namely the fi...
AbstractThe classical nonlinear shallow-water model (SWM) of an ideal fluid is considered. For the m...
The numerical simulation of exceptional events characterised by high hydraulic and hydrogeologic ris...
In this paper the numerical modeling and simulation of 2D shallow water equations is discussed with ...
This present study develops a 2-D numerical scheme to simulate the velocity and depth on the ac-tual...
The numerical solution of full shallow water equation (SWE) including the eddy viscosity terms is pr...
Summarization: A generalization and extension of a finite difference method for calculating numerica...
AbstractWe present a new finite volume method for the numerical solution of shallow water equations ...
The aim of the paper is numerical modeling of the shallow water equation with source terms by genuin...
This thesis covers the subject of deriving and solving the system of partial differential equations ...
After an examination of the derivation of the Shallow Water Equations and the assumptions involved, ...
A numerical method has been applied to the nonlinear shallow water wave equations for unforced line...
In the present work we discuss a special class of conservation laws, the one-dimensional Shallow Wat...
A shock-capturing, finite volume implementation of recently proposed non-hydrostatic two-dimensional...
We present a comparison of two discretization methods for the shallow water equations, namely the fi...
AbstractThe classical nonlinear shallow-water model (SWM) of an ideal fluid is considered. For the m...
The numerical simulation of exceptional events characterised by high hydraulic and hydrogeologic ris...
In this paper the numerical modeling and simulation of 2D shallow water equations is discussed with ...
This present study develops a 2-D numerical scheme to simulate the velocity and depth on the ac-tual...
The numerical solution of full shallow water equation (SWE) including the eddy viscosity terms is pr...
Summarization: A generalization and extension of a finite difference method for calculating numerica...
AbstractWe present a new finite volume method for the numerical solution of shallow water equations ...
The aim of the paper is numerical modeling of the shallow water equation with source terms by genuin...
This thesis covers the subject of deriving and solving the system of partial differential equations ...
After an examination of the derivation of the Shallow Water Equations and the assumptions involved, ...
A numerical method has been applied to the nonlinear shallow water wave equations for unforced line...
In the present work we discuss a special class of conservation laws, the one-dimensional Shallow Wat...
A shock-capturing, finite volume implementation of recently proposed non-hydrostatic two-dimensional...
We present a comparison of two discretization methods for the shallow water equations, namely the fi...
AbstractThe classical nonlinear shallow-water model (SWM) of an ideal fluid is considered. For the m...
The numerical simulation of exceptional events characterised by high hydraulic and hydrogeologic ris...