Distribution in coprime residue classes of polynomially-defined multiplicative functions

Abstract

An integer-valued multiplicative function f is said to be polynomially-defined if there is a nonconstant separable polynomial F(T)∈ Z[T] with f(p)=F(p) for all primes p. We study the distribution in coprime residue classes of polynomially-defined multiplicative functions, establishing equidistribution results allowing a wide range of uniformity in the modulus q. For example, we show that the values φ(n), sampled over integers n x with φ(n) coprime to q, are asymptotically equidistributed among the coprime classes modulo q, uniformly for moduli q coprime to 6 that are bounded by a fixed power of x.