Zeckendorf expansion, Dirichlet series and infinite series involving the infinite Fibonacci word

Abstract

Let β=1+52, (an)n ∈ N+ be a non-uniform morphic sequence involving the infinite Fibonacci word and (δ(n))n ∈ N+ be a positive sequence such that for all positive integers n, δ(n)=15Σj ≥ 0εjβj+2 if the unique Zeckendorf expansion of n is n=Σj ≥ 0εjFj+2 with Fibonacci numbers F0,F1,F2.... We define and study some Dirichlet series in the form of Σn≥ 1an(δ(n))s and relations between them. Moreover, we compute the values of some infinite series involving the infinite Fibonacci word.

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