Maximum size of reverse-free sets of permutations

Abstract

Two words have a reverse if they have the same pair of distinct letters on the same pair of positions, but in reversed order. A set of words no two of which have a reverse is said to be reverse-free. Let F(n,k) be the maximum size of a reverse-free set of words from [n]k where no letter repeats within a word. We show the following lower and upper bounds in the case n >= k: F(n,k) ∈ nk k-k/2 + O(k/log k). As a consequence of the lower bound, a set of n-permutations each two having a reverse has size at most nn/2 + O(n/log n).