On Incidences of and σ in the Function Field Setting

Abstract

Erdos first conjectured that infinitely often we have (n) = σ(m), where is the Euler totient function and σ is the sum of divisor function. This was proven true by Ford, Luca and Pomerance in 2010. We ask the analogous question of whether infinitely often we have (F) = σ(G) where F and G are polynomials over some finite field Fq. We find that when q=2 or 3, then this can only trivially happen when F=G=1. Moreover, we give a complete characterisation of the solutions in the case q=2 or 3. In particular, we show that (F) = σ(G) infinitely often when q=2 or 3.