# Enumeration of Stack-Sorting Preimages via a Decomposition Lemma

**Authors:** Colin Defant

arXiv: 1904.02829 · 2023-06-22

## TL;DR

This paper applies a new decomposition lemma to count preimages of permutation classes under the stack-sorting map, leading to new enumerations, formulas, and confirming several conjectures in permutation pattern theory.

## Contribution

It introduces applications of a decomposition lemma to enumerate preimages of permutation classes under stack-sorting, completing many enumeration problems for classes related to size 3 patterns.

## Key findings

- Enumeration of specific permutation classes using the decomposition lemma.
- Confirmation of conjectures related to Boolean-Catalan numbers.
- Explicit formulas for preimages with fixed number of descents.

## 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 $s^{-1}(\text{Av}(231,321))=\text{Av}(2341,3241,45231)$, finding a new example of an unbalanced Wilf equivalence. This result is equivalent to the enumeration of permutations sortable by ${\bf B}\circ s$, where ${\bf B}$ is the bubble sort map. We then prove that the sets $s^{-1}(\text{Av}(231,312))$, $s^{-1}(\text{Av}(132,231))=\text{Av}(2341,1342,\underline{32}41,\underline{31}42)$, and $s^{-1}(\text{Av}(132,312))=\text{Av}(1342,3142,3412,34\underline{21})$ 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 $s^{-1}(\text{Av}(\tau^{(1)},\ldots,\tau^{(r)}))$ for $\{\tau^{(1)},\ldots,\tau^{(r)}\}\subseteq S_3$ with the exception of the set $\{321\}$. We also find an explicit formula for $|s^{-1}(\text{Av}_{n,k}(231,312,321))|$, where $\text{Av}_{n,k}(231,312,321)$ is the set of permutations in $\text{Av}_n(231,312,321)$ with $k$ descents. This allows us to prove a conjectured identity involving Catalan numbers and order ideals in Young's lattice.

## Full text

_Full body text omitted from this summary view._ Fetch the complete paper as Markdown: https://tomesphere.com/paper/1904.02829/full.md

## Figures

4 figures with captions in the complete paper: https://tomesphere.com/paper/1904.02829/full.md

## References

48 references — full list in the complete paper: https://tomesphere.com/paper/1904.02829/full.md

---
Source: https://tomesphere.com/paper/1904.02829