On Approximate Stationary Radial Solutions for a Class of Boundary Value Problems Arising in Epitaxial Growth Theory

Amit Kumar Verma; Biswajit Pandit; Ravi P. Agarwal

On Approximate Stationary Radial Solutions for a Class of Boundary Value Problems Arising in Epitaxial Growth Theory

Publish place: Journal of Applied and Computational Mechanics، Vol: 6، Issue: 4

Publish Year: 1399

نوع سند: مقاله ژورنالی

زبان: English

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https://civilica.com/doc/1025575

شناسه ملی سند علمی:

JR_JACM-6-4_001

تاریخ نمایه سازی: 11 تیر 1399

Abstract:

In this paper, we consider a non-self-adjoint, singular, nonlinear fourth order boundary value problem which arises in the theory of epitaxial growth. It is possible to reduce the fourth order equation to a singular boundary value problem of second order given by w -1/r w =w^2/(2r^2 )+1/2 λ r^2. The problem depends on the parameter λ and admits multiple solutions. Therefore, it is difficult to pick multiple solutions together by any discrete method like finite difference method, finite element method etc. Here, we propose a new technique based on homotopy perturbation method and variational iteration method. We compare numerically the approximate solutions computed by Adomian decomposition method. We study the convergence analysis of both iterative schemes in C^2 ([0,1]). For small values of λ, solutions exist whereas for large values of λ solutions do not exist.

Keywords:

Singular boundary value problems , nonlinear boundary value problems , iterative method , convergence analysis , multiple solutions , non-self-adjoint operators , epitaxial growth

Authors

Amit Kumar Verma

Department of Mathematics, Indian Institute of Technology Patna, Patna, ۸۰۱۱۰۶, India

Biswajit Pandit

Department of Mathematics, Indian Institute of Technology Patna, Patna, ۸۰۱۱۰۶, India

Ravi P. Agarwal

Department of Mathematics, Texas A&M, University, Kingsville, ۷۰۰ University Blvd, Texas, ۷۸۳۶۳-۸۲۰۲, USA

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