Asymptotic behaviour of the solutions of  a class of $(k+1)$-order rational difference equations

Svetlin G. Georgiev

doi:10.5644/SJM.16.02.09

Asymptotic behaviour of the solutions of a class of $(k+1)$-order rational difference equations

Authors

Svetlin G. Georgiev

DOI:

https://doi.org/10.5644/SJM.16.02.09

Keywords:

boundedness, existence of solutions, equilibrium point, rational difference equation

Abstract

In this paper we investigate the solutions of a class of $(k+1)$-order rational difference equations. We give conditions for the parameters ensuring that the considered equation has a unique positive equilibrium point that is locally asymptotically stable and every positive solution of the considered equation is bounded and increasing and converges to the unique positive equilibrium point.

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Published

04.03.2022

How to Cite

Georgiev, S. G. (2022). Asymptotic behaviour of the solutions of a class of $(k+1)$-order rational difference equations. Sarajevo Journal of Mathematics, 16(2), 237–244. https://doi.org/10.5644/SJM.16.02.09

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Vol. 16 No. 2 (2020)

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Asymptotic behaviour of the solutions of a class of $(k+1)$-order rational difference equations

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