Slow Fibonacci Walks

Abstract

For a positive integer n, we study the number of steps to reach n by a Fibonacci walk for some starting pair a1 and a2 satisfying the recurrence of ak+2=ak+1+ak. The problem of slow Fibonacci walks, first suggested by Richard Stanley, is to determine the maximum number s(n) of steps for such a Fibonacci walk ending at n. Stanley conjectured that for most n, there is a slow Fibonacci walk reaching n = as with the property that as+1 is the integer closest to φ n where φ=(1+5)/2. We prove that this is true for only a positive fraction of n. We give explicit formulas for the choice of the starting pairs and the determination of s(n) by giving a characterization theorem. We also derive a number of density results concerning the distribution of down and up cases (that is, those n with as+1= φ n or φ n , respectively), as well as for more general `paradoxical' cases.