The global attractivity of a rational difference equation with variable delays

Hassan A. El-Morshedy

doi:10.1080/10236190902865652

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The global attractivity of a rational difference equation with variable delays

Journal article

Peer reviewed

The global attractivity of a rational difference equation with variable delays

Hassan A. El-Morshedy

Journal of difference equations and applications, Vol.16(12), pp.1481-1489

12/2010

DOI: https://doi.org/10.1080/10236190902865652

Abstract

equilibria

global attractivity

rational difference equations

variable delays

In this paper, we study the rational difference equation where p, , and are sequences of positive integers such that , for all and . It is proved that this equation has either one or two equilibria. The unique equilibrium point is proved to be the global attractor of all solutions. The dynamics, when the system has two equilibria, is also investigated.

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Title: The global attractivity of a rational difference equation with variable delays
Creators - without role: Hassan A. El-Morshedy - Damietta University
Publication Details: Journal of difference equations and applications, Vol.16(12), pp.1481-1489
Publisher: Taylor & Francis Group
Identifiers: 9939137608331
Academic Unit: King Abdulaziz University
Language: English
Resource Type: Journal article