Numerical bifurcation of predator-prey fractional differential equations with a constant rate harvesting

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contributor.author Erjaee, G.H. en_US
date.accessioned 2010-01-07T07:42:18Z en_US
date.available 2010-01-07T07:42:18Z en_US
date.issued 2008 en_US
identifier.citation Erjaee, G. H. (2008). Numerical bifurcation of predator-prey fractional differential equations with a constant rate harvesting. Journal of Physics: Conference Series, 96, 012045 en_US
identifier.uri http://dx.doi.org/10.1088/1742-6596/96/1/012045 en_US
identifier.uri http://hdl.handle.net/10576/10621 en_US
description.abstract In this article saddle and Hopf bifurcation points of predator-prey fractional differential equations system with a constant rate harvesting are investigated. The numerical results based on Grunwald-Letnikov discretization for fractional differential equations together with the Mickens' non-standard discretization method agree with those found by the corresponding ordinary differential equation system. en_US
language.iso en en_US
publisher IOP Publishing en_US
subject Mathematical physics en_US
subject Statistical physics and nonlinear systems en_US
title Numerical bifurcation of predator-prey fractional differential equations with a constant rate harvesting en_US
type Article en_US


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