Accurate numerical solutions of conservative nonlinear oscillators

Khan Najeeb Alam; Nasir Uddin Khan; Nadeem Alam Khan

doi:10.1515/nleng-2014-0009

Nonlinear Engineering (Dec 2014)

Accurate numerical solutions of conservative nonlinear oscillators

Khan Najeeb Alam,
Nasir Uddin Khan,
Nadeem Alam Khan

Affiliations

Khan Najeeb Alam: Department of Mathematical Sciences, University of Karachi, Karachi 75270, Pakistan
Nasir Uddin Khan: Department of Mathematical Sciences, University of Karachi, Karachi 75270, Pakistan
Nadeem Alam Khan: Department of Mathematical Sciences, University of Karachi, Karachi 75270, Pakistan

DOI: https://doi.org/10.1515/nleng-2014-0009
Journal volume & issue: Vol. 3, no. 4
pp. 197 – 201

Abstract

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The objective of this paper is to present an investigation to analyze the vibration of a conservative nonlinear oscillator in the form u" + lambda u + u^(2n-1) + (1 + epsilon^2 u^(4m))^(1/2) = 0 for any arbitrary power of n and m. This method converts the differential equation to sets of algebraic equations and solve numerically. We have presented for three different cases: a higher order Duffing equation, an equation with irrational restoring force and a plasma physics equation. It is also found that the method is valid for any arbitrary order of n and m. Comparisons have been made with the results found in the literature the method gives accurate results.

Published in Nonlinear Engineering

ISSN: 2192-8010 (Print); 2192-8029 (Online)
Publisher: De Gruyter
Country of publisher: Germany
LCC subjects: Technology: Engineering (General). Civil engineering (General)
Website: https://www.degruyter.com/view/j/nleng

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