Global Behavior of Solutions to Two Classes of Second Order Rational Difference Equations

Abstract

For nonnegative real numbers α, β, γ, A, B and C such that B+C>0 and α+β+γ >0, the difference equation equation* xn+1=α +β xn+γ xn-1A+B xn+C xn-1, n=0,1,2,... %, x-1,x0∈ [0,∞) equation* has a unique positive equilibrium. A proof is given here for the following statements: Theorem 1. For every choice of positive parameters α, β, γ, A, B and C, all solutions to the difference equation equation* xn+1=α +β xn+γ xn-1A+B xn+C xn-1, n=0,1,2,..., x-1,x0∈ [0,∞) equation* converge to the positive equilibrium or to a prime period-two solution. Theorem 2. For every choice of positive parameters α, β, γ, A, B and C, all solutions to the difference equation equation* xn+1= α +β xn+γ xn-1B xn+C xn-1, n=0,1,2,..., x-1,x0∈ (0,∞) equation* converge to the positive equilibrium or to a prime period-two solution.