论文信息 - A family of higher-order numerical schemes for the convection-diffusion equation in conservation form

A family of higher-order numerical schemes for the convection-diffusion equation in conservation form

In this paper, we introduce a class of compact, higher-order, exponentially-fitted discretizations of the steady, one-dimensional convection-diffusion equation in conservation form. This will be achieved by employing the Mehrstellenverfahren technique of L. Collatz. These new schemes are shown to be uniformly second order accurate in the small parameter e (the diffusion). The fourth-order accurate member of this family of schemes is studied in detail. Theoretical and numerical comparisons will be made to the methods of Allen-Southwell, El-Mistikawy-Werle, Leventhal, and Gartland. Additional examples exercising this new scheme are presented.

Brian J. McCartin | Michael W. Fisackerly

[1] M. J. Werle,et al. Numerical Method for Boundary Layers with Blowing—The Exponential Box Scheme , 1978 .

[2] Wil H. A. Schilders,et al. Uniform Numerical Methods for Problems with Initial and Boundary Layers , 1980 .

[3] Eugene C. Gartland,et al. Uniform high-order difference schemes for a singularly perturbed two-point boundary value problem , 1987 .

[4] D. N. De G. Allen,et al. RELAXATION METHODS APPLIED TO DETERMINE THE MOTION, IN TWO DIMENSIONS, OF A VISCOUS FLUID PAST A FIXED CYLINDER , 1955 .

[5] L. Collatz. The numerical treatment of differential equations , 1961 .

[6] S. Leventhal. An Operator Compact Implicit Method of Exponential Type , 1982 .