Hopf Bifurcation for a Class of Fractional Differential Equations With Delay
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Date
2012
Journal Title
Journal ISSN
Volume Title
Publisher
Springer
Open Access Color
Green Open Access
No
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Top 10%
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Top 10%
Abstract
The main purpose of this manuscript is to prove the existence of solutions for delay fractional order differential equations (FDE) at the neighborhood of its equilibrium point. After we convert the delay FDE into linear delay FDE by using its equilibrium point, we define the 1:2 resonant double Hopf point set with its characteristic equation. We find the members of this set in different cases. The bifurcation curves for a class of delay FDE are obtained within a differential operator of Caputo type with the lower terminal at -a.
Description
Babakhani, Azizollah/0000-0002-5342-1322
ORCID
Keywords
Fractional Calculus, Hopf Bifurcation, Stability theory of functional-differential equations, Hopf bifurcation, fractional calculus, Functional-differential equations with fractional derivatives, Bifurcation theory of functional-differential equations, Periodic solutions to functional-differential equations
Fields of Science
0103 physical sciences, 01 natural sciences
Citation
Babakhani, A., Baleanu, D., Khanbabaie, R. (2012). Hopf bifurcation for a class of fractional differential equations with delay. Nonlinear Dynamics, 69(3), 721-729. http://dx.doi.org/ 10.1007/s11071-011-0299-5
WoS Q
Q1
Scopus Q
Q1
OpenCitations Citation Count
28
Source
Nonlinear Dynamics
Volume
69
Issue
3
Start Page
721
End Page
729
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CrossRef : 19
Scopus : 32
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35
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33
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2
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