A Characterization of the 2m-4 Case of Highly Sorted Permutations

Abstract

Let s denote West's stack-sorting map. In 2020, Defant characterized and enumerated the set sn-m(Sn) for n ≥ 2m-3. While |sn-m(Sn)| = Bm when n ≥ 2m-2, where Bm denotes the mth Bell number, there are additional permutations when n = 2m-3. In this paper, we explore the more complex n = 2m-4 case, with several forms of additional permutations. We characterize sm-4(S2m-4) and find that its size is \[Bm + m2 + 7m - 282\] for m ≥ 5. This answers Defant's question about the 2m-4 case. Furthermore, we find some differences in the behavior of the 2m-5 case compared to the 2m-3 and 2m-4 cases.