The average order of the M\"obius function for Beurling primes

Abstract

In this paper, we study the counting functions P(x), NP(x) and MP(x) of a generalized prime system N. Here MP(x) is the partial sum of the M\"obius function over N not exceeding x. In particular, we study these when they are asymptotically well-behaved, in the sense that P(x) = x+O(x α+ε ), NP(x) = x+O(x β+ε ) and MP(x) = O(xγ+ε), for some >0 and α, β, γ<1. We show that the two largest of α,β,γ must be equal and at least 12.