Volume 20, pp. 86-103, 2005.

Uniform convergence of monotone iterative methods for semilinear singularly perturbed problems of elliptic and parabolic types

Igor Boglaev

Abstract

This paper deals with discrete monotone iterative methods for solving semilinear singularly perturbed problems of elliptic and parabolic types. The monotone iterative methods solve only linear discrete systems at each iterative step of the iterative process. Uniform convergence of the monotone iterative methods are investigated and rates of convergence are estimated. Numerical experiments complement the theoretical results.

Full Text (PDF) [256 KB], BibTeX

Key words

singular perturbation, reaction-diffusion problem, convection-diffusion problem, discrete monotone iterative method, uniform convergence

AMS subject classifications

65M06, 65N06

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