The inversion statistic in derangements and in other permutations with a prescribed number of fixed points

Abstract

We study how the inversion statistic is influenced by fixed points in a permutation. %The expected number of inversions in a uniformly random permutation in Sn is n(n-1)4. For each n∈N, and each k∈\0,1,·s, n\, let Pn(k) denote the uniform probability measure on the set of permutations in Sn with exactly k fixed points. We obtain an exact formula for the expected number of inversions under the measure Pn(k) as well as for Pn(k)(σ-1i<σ-1j), for 1 i<j n, the Pn(k)-probability that the number i precedes the number j. In particular, up to a super-exponentially small correction as n∞, the expected number of inversions in a random derangement (k=0) is 16n+112 more than the value n(n-1)4 that one obtains for a uniformly random general permutation in Sn. On the other hand, up to a super-exponentially small correction, for k2, the expected number of inversions in a random permutation with k fixed points is k-16n+k2-k-112 less than n(n-1)4. In the borderline case, k=1, up to a super-exponentially small correction, the expected number of inversions in a random permutation with one fixed point is 112 more than n(n-1)4. The proofs make strategic and perhaps novel use of the Chinese restaurant construction for a uniformly random permutation.