Revstack sort, zigzag patterns, descent polynomials of $t$-revstack sortable permutations, and Steingr\'imsson's sorting conjecture
Combinatorics
2014-04-08 v1
Abstract
In this paper we examine the sorting operator . Applying this operator to a permutation is equivalent to passing the permutation reversed through a stack. We prove theorems that characterise -revstack sortability in terms of patterns in a permutation that we call patterns. Using these theorems we characterise those permutations of length which are sorted by applications of for . We derive expressions for the descent polynomials of these six classes of permutations and use this information to prove Steingr\'imsson's sorting conjecture for those six values of . Symmetry and unimodality of the descent polynomials for general -revstack sortable permutations is also proven and three conjectures are given.
Keywords
Cite
@article{arxiv.1404.1457,
title = {Revstack sort, zigzag patterns, descent polynomials of $t$-revstack sortable permutations, and Steingr\'imsson's sorting conjecture},
author = {Mark Dukes},
journal= {arXiv preprint arXiv:1404.1457},
year = {2014}
}