Enumeration of Stack-Sorting Preimages via a Decomposition Lemma

Abstract

We give three applications of a recently-proven "Decomposition Lemma," which allows one to count preimages of certain sets of permutations under West's stack-sorting map s. We first enumerate the permutation class s-1(Av(231,321))=Av(2341,3241,45231), finding a new example of an unbalanced Wilf equivalence. This result is equivalent to the enumeration of permutations sortable by B s, where B is the bubble sort map. We then prove that the sets s-1(Av(231,312)), s-1(Av(132,231))=Av(2341,1342,3241,3142), and s-1(Av(132,312))=Av(1342,3142,3412,3421) are counted by the so-called "Boolean-Catalan numbers," settling a conjecture of the current author and another conjecture of Hossain. This completes the enumerations of all sets of the form s-1(Av(τ(1),…,τ(r))) for \τ(1),…,τ(r)\⊂eq S3 with the exception of the set \321\. We also find an explicit formula for |s-1(Avn,k(231,312,321))|, where Avn,k(231,312,321) is the set of permutations in Avn(231,312,321) with k descents. This allows us to prove a conjectured identity involving Catalan numbers and order ideals in Young's lattice.