A Lower Bound on the Expected Number of Distinct Patterns in a Random Permutation

Abstract

Let πn be a uniformly chosen random permutation on [n]. The authors of [2] showed that the expected number of distinct consecutive patterns of all lengths k∈\1,2,…,n\ in πn was n22(1-o(1)) as n∞, exhibiting the fact that random permutations pack consecutive patterns near-perfectly. A conjecture was made in [11] that the same is true for non-consecutive patterns, i.e., that there are 2n(1-o(1)) distinct non-consecutive patterns expected in a random permutation. This conjecture is false, but, in this paper, we prove that a random permutation contains an expected number of at least 2n-1(1+o(1)) distinct permutations; this number is half of the range of the number of distinct permutations.