On an Open Question Concerning Product-Type Difference Equations

Abstract

In [Acta Math. Univ. Comenianae Vol. LXXX, 1 (2011), pp. 63--70], Yang, Chen and Shi examined the system of difference equations \[ xn=ayn-p, yn=byn-pxn-qyn-q, n=0,1,…, \] where q is a positive integer with p < q, p q, p ≥ 3 is an odd number, both a and b are nonzero real constants, and the initial values x-q+1,x-q+2,…, x0,y-q+1,y-q+2,…,y0 are nonzero real numbers. At the end of their note, they posted a question regarding the behaviour of solutions of the given system when p is even. More precisely, they asked what the solutions of the system may look like if p is even. In this note we answer this question raised by the authors. Particularly, we show that the system may or may not admit a periodic solution depending on the coprimality of the parameters p and q and on the parity of the integer p/(p,q).