Convergence to equilibria in discrete population models

Hassan A. El-Morshedy; Eduardo Liz

doi:10.1080/10236190512331319334

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Convergence to equilibria in discrete population models

Journal article

Peer reviewed

Convergence to equilibria in discrete population models

Hassan A. El-Morshedy and Eduardo Liz

Journal of difference equations and applications, Vol.11(2), pp.117-131

01/02/2005

DOI: https://doi.org/10.1080/10236190512331319334

Abstract

Difference equations

Discrete population models

Global attractor

Schwarzian derivative

For a family of difference equations where and is continuous and decreasing, we find sufficient conditions for the convergence of all solutions to the unique positive equilibrium. In particular, we improve, up to our knowledge, all previous results on the global asymptotic stability of the equilibrium in the particular cases of the discrete Mackey-Glass and Lasota-Wazewska models in blood-cells production.

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Details

Title: Convergence to equilibria in discrete population models
Creators - without role: Hassan A. El-Morshedy - Damietta University
Eduardo Liz - Universidade de Vigo
Publication Details: Journal of difference equations and applications, Vol.11(2), pp.117-131
Publisher: Taylor & Francis GroupAbingdon, UK
Identifiers: 9936420008331
Academic Unit: King Abdulaziz University
Language: English
Resource Type: Journal article