A Semi-Lagrangian Scheme for Advection-Diffusion Equation

Abstract: This study proposes a semi-Lagrangian scheme for numerical simulation of advection-diffusion equation. The proposed method provides unconditional stability and highly accurate solutions even at large time steps. Another advantage of this method is that it requires a low computational time. Accuracy of the method is tested by a numerical application.

“…A variety of numerical methods have been proposed for solving ADE, such as the method of characteristics [3][4][5][6][7][8][9], the finite difference method [10][11][12][13][14][15][16][17][18][19], the finite element method [20][21][22][23], the differential quadrature method [24,25], the Lattice Boltzman method [26], and the meshless method [27][28][29][30]. In these studies, solutions of the ADE with constant parameters have been obtained.…”

Sixth-Order Combined Compact Finite Difference Scheme for the Numerical Solution of One-Dimensional Advection-Diffusion Equation with Variable Parameters

“…A variety of numerical methods have been proposed for solving ADE, such as the method of characteristics [3][4][5][6][7][8][9], the finite difference method [10][11][12][13][14][15][16][17][18][19], the finite element method [20][21][22][23], the differential quadrature method [24,25], the Lattice Boltzman method [26], and the meshless method [27][28][29][30]. In these studies, solutions of the ADE with constant parameters have been obtained.…”

Sixth-Order Combined Compact Finite Difference Scheme for the Numerical Solution of One-Dimensional Advection-Diffusion Equation with Variable Parameters