Enriched Cycle Structures and Roots of Permutations
Abstract
This paper is concerned with a duality between -regular permutations and -cycle permutations, and a monotone property due to B\'ona-McLennan-White on the probability for a random permutation of to have an -th root, where is a prime. For , the duality relates permutations with odd cycles to permutations with even cycles. To handle the general case where , we define an -enriched permutation as a permutation with -singular cycles colored by one of the colors . In this setup, we discover a bijection between -regular permutations and enriched -cycle permutations, which in turn yields a stronger version of an inequality of B\'ona-McLennan-White. This leads to a fully combinatorial understanding of the monotone property, thereby answering their question. When is a prime power , we further show that is monotone. In the case that , the equality has been established by Chernoff.
Keywords
Cite
@article{arxiv.2502.04136,
title = {Enriched Cycle Structures and Roots of Permutations},
author = {William Y. C. Chen and Elena L. Wang},
journal= {arXiv preprint arXiv:2502.04136},
year = {2025}
}
Comments
24 pages, to appear in Proc. Edinburgh Math. Soc