The number of distinct and repeated squares and cubes in the Fibonacci sequence

Abstract

The Fibonacci sequence F is the fixed point beginning with a of morphism σ(a,b)=(ab,a). In this paper, we get the explicit expressions of all squares and cubes, then we determine the number of distinct squares and cubes in F[1,n] for all n, where F[1,n] is the prefix of F of length n. By establishing and discussing the recursive structure of squares and cubes, we give algorithms for counting the number of repeated squares and cubes in F[1,n] for all n, and get explicit expressions for some special n such as n=fm (the Fibonacci number) etc., which including some known results such as in A.S.Fraenkel and J.Simpson, J.Shallit et al.