Distribution of the number of prime factors with a given multiplicity

Abstract

Given an integer k2, let ωk(n) denote the number of primes that divide n with multiplicity exactly k. We compute the density ek,m of those integers n for which ωk(n)=m for every integer m0. We also show that the generating function Σm=0∞ ek,mzm is an entire function that can be written in the form Πp (1+(p-1)(z-1)/pk+1 ); from this representation we show how to both numerically calculate the ek,m to high precision and provide an asymptotic upper bound for the ek,m. We further show how to generalize these results to all additive functions of the form Σj=2∞ aj ωj(n); when aj=j-1 this recovers a classical result of R\'enyi on the distribution of (n)-ω(n).