The asymptotic of the number of permutations whose cycle lengths are prime numbers

Abstract

Let A be a set of natural numbers and let Sn,A be the set of all permutations of [n]=\1,2,...,n\ with cycle lengths belonging to A. Furthermore, let A(n) denote the cardinality of the set A(n)=A [n]. The limit =n∞ A(n)/n (if it exists) is called the density of set A. It turns out that, as n∞, the cardinality Sn,A of the set Sn,A essentially depends on . The case >0 was studied by several authors under certain additional conditions on A. In 1999, Kolchin noticed that there is a lack studies on classes of permutations for which =0. In this context, he also proposed investigations on certain particular cases. In this paper, we consider the permutations whose cycle lengths are prime numbers, that is, we assume that A=P, where P denotes the set of all primes. For this class of permutations, the Prime Number Theorem implies that =0. In this paper, we show that, as n∞, the ratio Sn,P/(n-1)! approaches a finite limit and determine its value explicitly. Our method of proof employs classical Tauberian theorems.