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Non-monotone convergence schemes

Abstract

We consider the second order BVP x″ = f (t, x, x′), x′(a) = A, x′(b) = B provided that there exist α and β (lower and upper functions) such that: β′ (α) < A < α′(a) and β′(b) < B < α′ (b). We consider monotone and non-monotone approximations of solutions to the Neumann problem. The results and examples are provided.

Keyword : nonlinear boundary value problem, monotone iterations, Neumann boundary condition, non-monotone iterations

How to Cite
Dobkevich, M. (2012). Non-monotone convergence schemes. Mathematical Modelling and Analysis, 17(4), 589-597. https://doi.org/10.3846/13926292.2012.711780
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Sep 1, 2012
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