On common values of Fn and Nathanson's totient function Φ(m)

Abstract

In a recent paper, Chatterjee, the author and Mohan posed the problem of determining all solutions of the Diophantine equation Fn=Φ(m), where Fn is the n-th Fibonacci number and Φ(m) counts the number of nonempty sets A ⊂eq \1, 2, …, m\ for which (A) is relatively prime to m. In this paper, we prove that the Diophantine equation has the only solutions (n,m)=(1,1),(2,1),(3,2). The main tools used in this paper are lower bounds for linear forms in logarithms due to Matveev and Dujella-Pethő version of the Baker-Davenport reduction method in diophantine approximation.