The Hardy--Ramanujan inequality for sifted sets and its applications

Abstract

The well-known Hardy--Ramanujan inequality states that if ω(n) denotes the number of distinct prime factors of a positive integer n, then there is an absolute constant C>0 such that uniformly for x2 and k∈N, \[\#\n xω(n)=k\x( x+C)k-1(k-1)! x.\] A myriad of generalizations and variations of this inequality have been discovered. In this paper, we establish a weighted version of this inequality for sifted sets, which generalizes an earlier result of Hal\'asz and implies Timofeev's theorems on shifted primes. We then explore its applications to a variety of intriguing problems, such as large deviations of ω on subsets of integers, the Erdos multiplication table problem, divisors of shifted primes, and the image of the Carmichael λ-function. Building on the same circle of ideas, we also generalize Troupe's result on the normal order of ω(s(n)) for the sum-of-proper-divisors function s(n), confirming for the first time the weighted version of a special case of a 1992 conjecture by Erdos, Granville, Pomerance, and Spiro.