Journal article

Semi-analytical solutions for the 1- and 2-D diffusive Nicholson's blowflies equation

HY Alfifi, TR Marchant, MI Nelson

IMA Journal of Applied Mathematics Institute of Mathematics and Its Applications | OXFORD UNIV PRESS | Published : 2014

Abstract

Semi-analytical solutions are developed for the diffusive Nicholson's blowflies equation. Both one and two-dimensional geometries are considered. The Galerkin method, which assumes a spatial structure for the solution, is used to approximate the governing delay partial differential equation by a system of ordinary differential delay equations. Both steady-state and transient solutions are presented. Semi-analytical results for the stability of the system are derived and the critical parameter value, at which a Hopf bifurcation occurs, is found. Semi-analytical bifurcation diagrams and phase-plane maps are drawn, which show the initial Hopf bifurcation together with a classical period doublin..

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University of Melbourne Researchers

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Funding Acknowledgements

The authors wish to thank two anonymous referees for their useful suggestions. Hassan Alfifi gratefully acknowledges the Saudi government and the University of Dammam (Saudi Arabia) for the awarding of a PhD Scholarship.