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

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. Leonetti and Sanna proved that A has natural density equal to zero, and asked for a more precise upper bound. We prove that equation* \#(A [1, x]) x x x equation* for all sufficiently large x.

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