Crank-Nicolson finite difference method based on a midpoint upwind scheme on a non-uniform mesh for time-dependent singularly perturbed convection-diffusion equations

A numerical approach is proposed to examine the singularly perturbed time-dependent convection-diffusion equation in one space dimension on a rectangular domain. The solution of the considered problem exhibits a boundary layer on the right side of the domain. We semi-discretize the continuous proble...

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Bibliographic Details
Published in:International journal of computer mathematics 2008-05, Vol.85 (5), p.771-790
Main Authors: Kadalbajoo, M. K., Awasthi, Ashish
Format: Article
Language:English
Subjects:
Crank-Nicolson finite difference Scheme
Midpoint upwind
Shishkin mesh
Singular perturbation
Singularly perturbed convection-diffusion equation
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Summary:A numerical approach is proposed to examine the singularly perturbed time-dependent convection-diffusion equation in one space dimension on a rectangular domain. The solution of the considered problem exhibits a boundary layer on the right side of the domain. We semi-discretize the continuous problem by means of the Crank-Nicolson finite difference method in the temporal direction. The semi-discretization yields a set of ordinary differential equations and the resulting set of ordinary differential equations is discretized by using a midpoint upwind finite difference scheme on a non-uniform mesh of Shishkin type. The resulting finite difference method is shown to be almost second-order accurate in a coarse mesh and almost first-order accurate in a fine mesh in the spatial direction. The accuracy achieved in the temporal direction is almost second order. An extensive amount of analysis has been carried out in order to prove the uniform convergence of the method. Finally we have found that the resulting method is uniformly convergent with respect to the singular perturbation parameter, i.e. ϵ-uniform. Some numerical experiments have been carried out to validate the proposed theoretical results.
ISSN:0020-7160
1029-0265
DOI:10.1080/00207160701459672