The proportion of permutations fixing a k-set

Abstract

Denote by p(k) the limit, as n → ∞, of the probability that a random permutation on a set of size n has an invariant set of size k. We give an asymptotic formula for p(k), showing that it is asymptotically f(\2 k\) k-δ ( k)-3/2 where δ = 1 - 1 + 2 2 ≈ 0.086 and f is a smooth, positive, function on R/Z, which we will describe explicitly. The function f satisfies f f < 1 + 2 × 10-7 and we conjecture that it is not constant. Estimating p(k) is a model for the more well-known question which asks for an estimation of M(n), the number of distinct elements in the n-by-n multiplication table. By elaborating on the techniques in this paper, we will give an asymptotic for M(n) in forthcoming work.