Abstract
In this article, we study the problem of determining an appropriate grading of meshes for a system of coupled singularly perturbed reaction–diffusion problems having diffusion parameters with different magnitudes. The central difference scheme is used to discretize the problem on adaptively generated mesh where the mesh equation is derived using an equidistribution principle. An a priori monitor function is obtained from the error estimate. A suitable a posteriori analogue of this monitor function is also derived for the mesh construction which will lead to an optimal second-order parameter uniform convergence. We present the results of numerical experiments for linear and semilinear reaction–diffusion systems to support the effectiveness of our preferred monitor function obtained from theoretical analysis.
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