On the greatest common divisor of $n$ and the $n$th Fibonacci number

Carlo Sanna

doi:10.1216/RMJ-2018-48-4-1191

On the greatest common divisor of n and the nth Fibonacci number

Abstract

Let A be the set of all integers of the form (n, Fn), where n is a positive integer and Fn denotes the nth Fibonacci number. We prove that \#(A [1, x]) x / x for all x ≥ 2, and that A has zero asymptotic density. Our proofs rely on a recent result of Cubre and Rouse which gives, for each positive integer n, an explicit formula for the density of primes p such that n divides the rank of appearance of p, that is, the smallest positive integer k such that p divides Fk.

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