Greatest common divisors of shifted primes and Fibonacci numbers

Abstract

Let (Fn) be the sequence of Fibonacci numbers and, for each positive integer k, let Pk be the set of primes p such that (p - 1, Fp - 1) = k. We prove that the relative density r(Pk) of Pk exists, and we give a formula for r(Pk) in terms of an absolutely convergent series. Furthermore, we give an effective criterion to establish if a given k satisfies r(Pk) > 0, and we provide upper and lower bounds for the counting function of the set of such k's. As an application of our results, we give a new proof of a lower bound for the counting function of the set of integers of the form (n, Fn), for some positive integer n. Our proof is more elementary than the previous one given by Leonetti and Sanna, which relies on a result of Cubre and Rouse.