On rational systems in the plane. I. Riccati Cases

Abstract

This paper is the first in a series of papers which will address, on a case by case basis, the special cases of the following rational system in the plane, labeled system #11. xn+1=α1A1+yn, yn+1=α2+β2xn+γ2ynA2+B2xn+C2yn, n=0,1,2,..., with α1,A1>0 and α2, β2, γ2, A2, B2, C2≥ 0 and α2+β2+γ2>0 and A2+B2+C2>0 and nonnegative initial conditions x0 and y0 so that the denominator is never zero. In this article we focus on the special cases which are reducible to the Riccati difference equation.