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On the residue class distribution of the number of prime divisors of an integer

arXiv:0906.1029

Abstract

The {\em Liouville function} is defined by $\gl(n):=(-1)^{Ω(n)}$ where $Ω(n)$ is the number of prime divisors of $n$ counting multiplicity. Let $\z_m:=e^{2πi/m}$ be a primitive $m$--th root of unity. As a generalization of Liouville's function, we study the functions $\gl_{m,k}(n):=\z_m^{kΩ(n)}$. Using properties of these functions, we give a weak equidistribution result for $Ω(n)$ among residue classes. More formally, we show that for any positive integer $m$, there exists an $A>0$ such that for all $j=0,1,...,m-1,$ we have $$#\{n\leq x:Ω(n)\equiv j (\bmod m)\}=\frac{x}{m}+O(\frac{x}{\log^A x}).$$ Best possible error terms are also discussed. In particular, we show that for $m>2$ the error term is not $o(x^\ga)$ for any $\ga<1$.

7 pages