Global behavior of a two-dimensional monotone difference system

Inoue, Momoe; Matsunaga, Hideaki

doi:10.2969/aspm/05310129

VOL. 53 | 2009 Global behavior of a two-dimensional monotone difference system

Chapter Author(s) Momoe Inoue, Hideaki Matsunaga

Editor(s) Saber Elaydi, Kazuo Nishimura, Mitsuhiro Shishikura, Nobuyuki Tose

Adv. Stud. Pure Math., 2009: 129-139 (2009) DOI: 10.2969/aspm/05310129

Abstract

We investigate global behavior of solutions of a nonlinear difference system $x_{n + 1} = p x_{n} (1 + y_{n}), y_{n + 1} = q y_{n} (1 + x_{n}), n = 0, 1, 2, \dots,$ where parameters $p$ , $q$ and initial values $x_{0}$ , $y_{0}$ are positive. We give sufficient conditions for every solution of the system to be unbounded and sufficient conditions for the global stable manifold of the positive equilibrium to exist, which is a unbounded separatrix for the system. Some related conjectures are also given.