A note on the power sums of the number of Fibonacci partitions

Abstract

For every nonnegative integer n, let rF(n) be the number of ways to write n as a sum of Fibonacci numbers, where the order of the summands does not matter. Moreover, for all positive integers p and N, let equation* SF(p)(N) := Σn = 0N - 1 (rF(n))p . equation* Chow, Jones, and Slattery determined the order of growth of SF(p)(N) for p ∈ \1,2\. We prove that, for all positive integers p, there exists a real number λp > 1 such that equation* S(p)F(N) p N( λp) /\! equation* as N +∞, where := (1 + 5)/2 is the golden ratio. Furthermore, we show that equation* p +∞ λp1/p = 1/2 . equation* Our proofs employ automata theory and a result on the generalized spectral radius due to Blondel and Nesterov.