Linear Fractional Recurrences: Periodicities and Integrability

Abstract

We consider k-step recurrences of the form zn+k = A(z)/B(z), where A and B are linear functions of zn, zn+1, ..., zn+k-1, which we call k-step linear fractional recurrences. The first Theorem in this paper shows that for each k there are k-step linear fractional recurrences which are periodic of period 4k. Among this class of recurrences, there is also the so-called Lyness process, which has the form A(z)/B(z) = (a +zn+1 + zn+2 + ... + zn+k-1)/zn. The second Theorem shows that the Lyness process has quadratic degree growth. The Lyness process is integrable, and we discuss its known integrals.