Permutations with orders coprime to a given integer

Abstract

Let m be a positive integer and let (m,n) be the proportion of permutations of the symmetric group Sym(n) whose order is coprime to m. In 2002, Pouyanne proved that (n,m)n1-φ(m)m m where m is a complicated (unbounded) function of m. We show that there exists a positive constant C(m) such that, for all n ≥slant m, \[C(m) (nm)φ(m)m-1 ≤slant (n,m) ≤slant (nm)φ(m)m-1\] where φ is Euler's totient function.