A method of the numerical solution of a 2-D linear advection equation is proposed. In the solution, the modified finite element method and directional splitting technique is used. For the time integration the two-step differential scheme is used. Two weighting parameters introduced into the schemes determine the accuracy and stability of the solution. Numerical diffusion and dispersion tensors are derived for the pure advection equation solved using the proposed method. They enable the explanation of numerical properties and applicability of this scheme. The proposed scheme is of third-order accuracy and is adaptive, allowing for simultaneous elimination of numerical diffusion and dispersion from the solution of a 2-D advection equation
AbstractThe study of the advection–diffusion equation continues to be an active field of research. T...
Up to tenth-order finite difference schemes are proposed in this paper to solve one-dimensional adve...
Up to tenth-order finite difference schemes are proposed in this paper to solve one-dimensional adve...
The paper concerns the numerical solution of one-dimensional (1D) and two-dimensional (2D) advection...
In this study, effects of operator splitting methods to the solution of advection-diffusion equation...
In this paper a time-splitting technique for the two-dimensional advection-dispersion equation is pr...
We perform a spectral analysis of the dispersive and dissipative properties of two time-splitting pr...
Time-split methods for multidimensional advection-diffusion equations are considered. In these metho...
A high-order splitting scheme for the advection-diffusion equation of pollutants is proposed in this...
Abstract. In this work we develop a finite difference method for the solution of the 1-D two-sided f...
A high-order splitting scheme for the advection-diffusion equation of pollutants is proposed in this...
In this paper we present a time-splitting approach for advection-di\-sper\-sion equations. We split ...
Abstarct: Advection-diffusion equation with constant and variable coefficients has a wide range of p...
Numerical methods for advection-diffusion equations are discussed based on approximating advection u...
In this paper a time-splitting approach for the advection-dispersion equation describing solute tran...
AbstractThe study of the advection–diffusion equation continues to be an active field of research. T...
Up to tenth-order finite difference schemes are proposed in this paper to solve one-dimensional adve...
Up to tenth-order finite difference schemes are proposed in this paper to solve one-dimensional adve...
The paper concerns the numerical solution of one-dimensional (1D) and two-dimensional (2D) advection...
In this study, effects of operator splitting methods to the solution of advection-diffusion equation...
In this paper a time-splitting technique for the two-dimensional advection-dispersion equation is pr...
We perform a spectral analysis of the dispersive and dissipative properties of two time-splitting pr...
Time-split methods for multidimensional advection-diffusion equations are considered. In these metho...
A high-order splitting scheme for the advection-diffusion equation of pollutants is proposed in this...
Abstract. In this work we develop a finite difference method for the solution of the 1-D two-sided f...
A high-order splitting scheme for the advection-diffusion equation of pollutants is proposed in this...
In this paper we present a time-splitting approach for advection-di\-sper\-sion equations. We split ...
Abstarct: Advection-diffusion equation with constant and variable coefficients has a wide range of p...
Numerical methods for advection-diffusion equations are discussed based on approximating advection u...
In this paper a time-splitting approach for the advection-dispersion equation describing solute tran...
AbstractThe study of the advection–diffusion equation continues to be an active field of research. T...
Up to tenth-order finite difference schemes are proposed in this paper to solve one-dimensional adve...
Up to tenth-order finite difference schemes are proposed in this paper to solve one-dimensional adve...