English

R\'edei permutations with the same cycle structure

Number Theory 2022-05-24 v2 Combinatorics

Abstract

Let Fq\mathbb{F}_q be the finite field of order qq, and P1(Fq)=Fq{}\mathbb P^1(\mathbb{F}_q) = \mathbb F_q\cup \{\infty\}. Write (x+y)m(x+\sqrt y)^m as N(x,y)+D(x,y)yN(x,y)+D(x,y)\sqrt{y}. For mNm\in\mathbb N and aFqa \in \mathbb{F}_q, the R\'edei function Rm,a ⁣:P1(Fq)P1(Fq)R_{m,a}\colon \mathbb P^1(\mathbb F_q) \to \mathbb P^1(\mathbb F_q) is defined by N(x,a)/D(x,a)N(x,a)/D(x,a) if D(x,a)0D(x,a)\neq 0 and xx\neq\infty, and \infty, otherwise. In this paper we give a complete characterization of all pairs (m,n)N2(m,n)\in\mathbb N^2 such that the R\'edei permutations Rm,aR_{m,a} and Rn,bR_{n,b} have the same cycle structure when aa and bb have the same quadratic character and qq is odd. We explore some relationships between such pairs (m,n)(m,n), and provide explicit families of R\'edei permutations with the same cycle structure. When a R\'edei permutation has a unique cycle structure that is not shared by any other R\'edei permutation, we call it isolated. We show that the only isolated R\'edei permutations are the isolated R\'edei involutions. Moreover, all our results can be transferred to bijections of the form mxmx and xmx^m on certain domains.

Cite

@article{arxiv.2110.02143,
  title  = {R\'edei permutations with the same cycle structure},
  author = {Juliane Capaverde and Ariane M. Masuda and Virgínia M. Rodrigues},
  journal= {arXiv preprint arXiv:2110.02143},
  year   = {2022}
}
R2 v1 2026-06-24T06:38:26.440Z