Unimodular Fake Mobius Functions

Abstract

Let S1 denote the unit circle. We introduce and develop the analytic and bias theory of unimodular fake Möbius functions, i.e. multiplicative functions f:N S1 \0\ whose prime-power values are prescribed by a fixed sequence \k\k1 via the rule f(pk)=k for every prime p and every k1. A key feature of these functions is that their Dirichlet series admit a factorization into complex powers of the Riemann zeta function. Our main analytic result is an explicit formula for the smoothed summatory function Σn1f(n)e-n/x, consisting of a leading main term together with a sequence of lower-order terms. The formula may be viewed as an extension of the Selberg-Delange method and is expected to be of independent interest. As an application, we introduce a notion of bias at a natural scale and obtain an explicit criterion distinguishing persistent bias, apparent bias, and no bias for unimodular fake Möbius functions.