Multiplicative arithmetic functions and the generalized Ewens measure

Abstract

Random integers, sampled uniformly from [1,x], share similarities with random permutations, sampled uniformly from Sn. These similarities include the Erdos--Kac theorem on the distribution of the number of prime factors of a random integer, and Billingsley's theorem on the largest prime factors of a random integer. In this paper we extend this analogy to non-uniform distributions. Given a multiplicative function α N R 0, one may associate with it a measure on the integers in [1,x], where n is sampled with probability proportional to the value α(n). Analogously, given a sequence \ θi\i 1 of non-negative reals, one may associate with it a measure on Sn that assigns to a permutation a probability proportional to a product of weights over the cycles of the permutation. This measure is known as the generalized Ewens measure. We study the case where the mean value of α over primes tends to some positive θ, as well as the weights α(p) ≈ ( p)γ. In both cases, we obtain results in the integer setting which are in agreement with those in the permutation setting.