Enriched Cycle Structures and Roots of Permutations

Abstract

This paper is concerned with a duality between r-regular permutations and r-cycle permutations, and a monotone property due to B\'ona-McLennan-White on the probability pr(n) for a random permutation of \1,2,…, n\ to have an r-th root, where r is a prime. For r=2, the duality relates permutations with odd cycles to permutations with even cycles. To handle the general case where r≥ 2, we define an r-enriched permutation as a permutation with r-singular cycles colored by one of the colors 1, 2, …, r-1. In this setup, we discover a bijection between r-regular permutations and enriched r-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 r is a prime power ql, we further show that pr(n) is monotone. In the case that n+1 0 q, the equality pr(n)=pr(n+1) has been established by Chernoff.

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