On the periodic logistic equation

On the periodic logistic equation

We show that the -periodic logistic equation ₙ₊₁ = μₙ mod ₙ(1 - ₙ) has cycles (periodic solutions) of minimal periods 1; ; 2; 3; …. Then we extend Singer’s theorem to periodic difference equations, and use it to show the -periodic logistic equation has at most stable cycles. Also, we present computa...

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Bibliographic Details
Main Author:	Al-Sharawi, Ziyad (author)
Other Authors:	Angelos, James (author)
Format:	article
Published:	2006
Subjects:	Logistic map Non-autonomous Periodic solutions Singer’s theorem Attractors
Online Access:	http://hdl.handle.net/11073/16689
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