Dynamics of the Fibonacci Order of Appearance Map

Abstract

The order of appearance z(n) of a positive integer n in the Fibonacci sequence is defined as the smallest positive integer j such that n divides the j -th Fibonacci number. A fixed point arises when, for a positive integer n , we have that the nth Fibonacci number is the smallest Fibonacci that n divides. In other words, z(n) = n . In 2012, Marques proved that fixed points occur only when n is of the form 5k or 12·5k for all non-negative integers k . It immediately follows that there are infinitely many fixed points in the Fibonacci sequence. We prove that there are infinitely many integers that iterate to a fixed point in exactly k steps. In addition, we construct infinite families of integers that go to each fixed point of the form 12 · 5k. We conclude by providing an alternate proof that all positive integers n reach a fixed point after a finite number of iterations.