Saber Elaydi scite author profile

Elaydi and Yakubu showed that a globally asymptotically stable(GAS) periodic orbit in an autonomous difference equation must in fact be a fixed point whenever the phase space is connected. In this paper we extend this result to periodic nonautonomous difference equations via the concept of skew-product dynamical systems. We show that for a k-periodic difference equation, if a periodic orbit of period r is GAS, then r must be a divisor of k: In particular subharmonic, or long periodic, oscillations cannot occur. Moreover, if r divides k we construct a non-autonomous dynamical system having minimum period k and which has a GAS periodic orbit with minimum period r: Our methods are then applied to prove a conjecture by J. Cushing and S. Henson concerning a non-autonomous Beverton-Holt equation which arises in the study of the response of a population to a periodically fluctuating environmental force such as seasonal fluctuations in carrying capacity or demographic parameters like birth or death rates. r

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Exponential trichotomy of differential systems

Elaydi

Hájek

1988

Journal of Mathematical Analysis and Applications

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Nonautonomous Beverton-Holt equations and the Cushing-Henson conjectures

Elaydi

Sacker

2005

Journal of Difference Equations and Applications

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Saber Elaydi

An Introduction to Difference Equations

An Introduction to Difference Equations

Global stability of periodic orbits of non-autonomous difference equations and population biology

Exponential trichotomy of differential systems

Nonautonomous Beverton-Holt equations and the Cushing-Henson conjectures

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