On the Global Behavior of Solutions to a Planar System of Difference Equations

Abstract

We establish the relation between local stability of equilibria and slopes of critical curves for a specific class of difference equations. We then use this result to give global behavior results for nonnegative solutions of the system of difference equations equation* %LGIN arrayrcl xn+1 & = & b1 xn1+xn+c1 yn +h1 yn+1 & = & b2 yn1+yn+c2 xn +h2 array n=0,1,..., (x0,y0) ∈ [0,∞)× [0,∞) equation* with positive parameters. In particular, we show that the system has between one and three equilibria, and that the number of equilibria determines global behavior as follows: if there is only one equilibrium, then it is globally asymptotically stable. If there are two equilibria, then one is a local attractor and the other one is nonhyperbolic. If there are three equilibria, then they are linearly ordered in the south-east ordering of the plane, and consist of a local attractor, a saddle point, and another local attractor. Finally, we give sufficient conditions for having a unique equilibrium.