Research Article

ON THE ORDER OF MAXIMUM ERROR OF THE FINITE DIFFERENCE SOLUTIONS OF LAPLACE’S EQUATION ON RECTANGLES

A. A. DOSIYEV^a1 c1 and S. CIVAL BURANAY^a2

^a1 Department of Mathematics, Eastern Mediterranean University, Gazimagusa, Cyprus, Mersin 10, Turkey (email: adiguzel.dosiyev@emu.edu.tr)

^a2 Department of Mathematics, Eastern Mediterranean University, Gazimagusa, Cyprus, Mersin 10, Turkey (email: suzan.buranay@emu.edu.tr)

Abstract

The finite difference solution of the Dirichlet problem on rectangles when a boundary function is given from C^1,1 is analyzed. It is shown that the maximum error for a nine-point approximation is of the order of O(h²(|ln  h|+1)) as a five-point approximation. This order can be improved up to O(h²) when the nine-point approximation in the grids which are a distance h from the boundary is replaced by a five-point approximation (“five and nine”-point scheme). It is also proved that the class of boundary functions C^1,1 used to obtain the error estimations essentially cannot be enlarged. We provide numerical experiments to support the analysis made. These results point at the importance of taking the smoothness of the boundary functions into account when choosing the numerical algorithms in applied problems.

(Received May 04 2007)

(Revised April 28 2008)

2000 Mathematics subject classification

• 65N06;
• 65N15

Keywords and phrases

• finite difference method;
• nonsmooth solutions;
• uniform error

Correspondence:

^c1 For correspondence; e-mail: adiguzel.dosiyev@emu.edu.tr