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Well ordered monotone iterative technique for nonlinear second order four point Dirichlet BVPs

    Amit Verma   Affiliation
    ; Nazia Urus   Affiliation

Abstract

In this article, we develop a monotone iterative technique (MI-technique) with lower and upper (L-U) solutions for a class of four-point Dirichlet nonlinear boundary value problems (NLBVPs), defined as,  where , the non linear term is continuous function in x, one sided Lipschitz in ψ and Lipschitz in . To show the existence result, we construct Green’s function and iterative sequences for the corresponding linear problem. We use quasilinearization to construct these iterative schemes. We prove maximum principle and establish monotonicity of sequences of lower solution  and upper solution such that   Then under certain sufficient conditions we prove that these sequences converge uniformly to the solution ψ(x) in a specific region where

Keyword : Green’s function, monotone iterative technique, maximum principle

How to Cite
Verma, A., & Urus, N. (2022). Well ordered monotone iterative technique for nonlinear second order four point Dirichlet BVPs. Mathematical Modelling and Analysis, 27(1), 59–77. https://doi.org/10.3846/mma.2022.14198
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Feb 7, 2022
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