Ballot Permutations and Odd Order Permutations
Abstract
A permutation is ballot if, for all , the word has at least as many ascents as it has descents. Let denote the number of ballot permutations of order , and let denote the number of permutations which have odd order in the symmetric group . Callan conjectured that for all , which was proved by Bernardi, Duplantier, and Nadeau. We propose a refinement of Callan's original conjecture. Let denote the number of ballot permutations with descents. Let denote the number of odd order permutations with , where is a certain statistic related to the cyclic descents of . We conjecture that for all and . We prove this stronger conjecture for the cases , and , and in each of these cases we establish formulas for involving Eulerian numbers and Eulerian-Catalan numbers.
Cite
@article{arxiv.1810.00993,
title = {Ballot Permutations and Odd Order Permutations},
author = {Sam Spiro},
journal= {arXiv preprint arXiv:1810.00993},
year = {2019}
}
Comments
There was an error with an alternative formula for b(n,3) that was on page 3