New formulas counting one-face maps and Chapuy's recursion
Combinatorics
2017-04-24 v5
Abstract
In this paper, we begin with the Lehman-Walsh formula counting one-face maps and construct two involutions on pairs of permutations to obtain a new formula for the number of one-face maps of genus . Our new formula is in the form of a convolution of the Stirling numbers of the first kind which immediately implies a formula for the generating function other than the well-known Harer-Zagier formula. By reformulating our expression for in terms of the backward shift operator and proving a property satisfied by polynomials of the form , we easily establish the recursion obtained by Chapuy for . Moreover, we give a simple combinatorial interpretation for the Harer-Zagier recurrence.
Keywords
Cite
@article{arxiv.1510.05038,
title = {New formulas counting one-face maps and Chapuy's recursion},
author = {Ricky X. F. Chen and Christian M. Reidys},
journal= {arXiv preprint arXiv:1510.05038},
year = {2017}
}
Comments
reorganized and a more suggestive title is used. submitted