On a general system of difference equations defined by homogeneous functions

Nouressadat Touafek

doi:10.1515/ms-2021-0014

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On a general system of difference equations defined by homogeneous functions

Nouressadat Touafek

Veröffentlicht/Copyright: 8. Juni 2021

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Aus der Zeitschrift Mathematica Slovaca Band 71 Heft 3

Abstract

The aim of this paper is to study the following second order system of difference equations

xn+1=f(yn,yn−1),yn+1=g(xn,xn−1)

where n ∈ ℕ₀, the initial values x₋₁, x₀, y₋₁ and y₀ are positive real numbers, the functions f, g : (0, +∞)² → (0, +∞) are continuous and homogeneous of degree zero. In this study, we establish results on local stability of the unique equilibrium point and to deal with the global attractivity, and so the global stability, some general convergence theorems are provided. Necessary and sufficient conditions on existence of prime period two solutions of our system are given. Also, a result on oscillatory solutions is proved. As applications of the obtained results, concrete models of systems of difference equations defined by homogeneous functions of degree zero are investigated. Our system generalize some existing works in the literature and our results can be applied to study new models of systems of difference equations. For interested readers, we left in the conclusion as open problems two more general systems of higher order defined by homogenous functions of degree zero.

MSC 2010: 39A05; 39A21; 39A23; 39A30

Keywords: Homogeneous difference equations; global and local stability; periodicity; oscillation

This work was supported by DGRSDT (MESRS, DZ).

Acknowledgement

The author would like to thank the two referees for their comments, remarks and suggestions which significantly improved the presentation of the paper.

(Communicated by Michal Fečkan)

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Received: 2020-06-01

Accepted: 2020-07-11

Published Online: 2021-06-08

Published in Print: 2021-06-25

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Artikel in diesem Heft

https://doi.org/10.1515/ms-2021-0014

Schlagwörter für diesen Artikel

Homogeneous difference equations; global and local stability; periodicity; oscillation