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

Abstract

The Liouville function is defined by (n):=(-1)(n) where (n) is the number of prime divisors of n counting multiplicity. Let m:=e2π i/m be a primitive m--th root of unity. As a generalization of Liouville's function, we study the functions m,k(n):=mk(n). Using properties of these functions, we give a weak equidistribution result for (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≤ x:(n) j ( m)\=xm+O(xA x). Best possible error terms are also discussed. In particular, we show that for m>2 the error term is not o(x) for any <1.