Distribution mod p of Euler's totient and the sum of proper divisors

Abstract

We consider the distribution in residue classes modulo primes p of Euler's totient function φ(n) and the sum-of-proper-divisors function s(n):=σ(n)-n. We prove that the values φ(n), for n x, that are coprime to p are asymptotically uniformly distributed among the p-1 coprime residue classes modulo p, uniformly for 5 p (x)A (with A fixed but arbitrary). We also show that the values of s(n), for n composite, are uniformly distributed among all p residue classes modulo every p (x)A. These appear to be the first results of their kind where the modulus is allowed to grow substantially with x.