English

Ballot Permutations and Odd Order Permutations

Combinatorics 2019-03-15 v6

Abstract

A permutation π\pi is ballot if, for all kk, the word π1πk\pi_1\cdots \pi_k has at least as many ascents as it has descents. Let b(n)b(n) denote the number of ballot permutations of order nn, and let p(n)p(n) denote the number of permutations which have odd order in the symmetric group SnS_n. Callan conjectured that b(n)=p(n)b(n)=p(n) for all nn, which was proved by Bernardi, Duplantier, and Nadeau. We propose a refinement of Callan's original conjecture. Let b(n,d)b(n,d) denote the number of ballot permutations with dd descents. Let p(n,d)p(n,d) denote the number of odd order permutations with M(π)=dM(\pi)=d, where M(π)M(\pi) is a certain statistic related to the cyclic descents of π\pi. We conjecture that b(n,d)=p(n,d)b(n,d)=p(n,d) for all nn and dd. We prove this stronger conjecture for the cases d=1, 2, 3d=1,\ 2,\ 3, and d=(n1)/2d=\lfloor(n-1)/2\rfloor, and in each of these cases we establish formulas for b(n,d)b(n,d) involving Eulerian numbers and Eulerian-Catalan numbers.

Keywords

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

R2 v1 2026-06-23T04:25:08.902Z