On multiplicative functions which are small on average

Dimitris Koukoulopoulos

doi:10.1007/s00039-013-0235-6

On multiplicative functions which are small on average

Abstract

Let f be a completely multiplicative function that assumes values inside the unit disc. We show that if Σn<x f(n) x/( x)A, x>2, for some A>2, then either f(p) is small on average or f pretends to be μ(n)nit for some t.

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