English

A hook formula for eigenvalues of k-point fixing graph

Combinatorics 2023-02-03 v1 Group Theory

Abstract

Let SnS_n denote the symmetric group on nn letters. The kk-point fixing graph F(n,k)\mathcal{F}(n,k) is defined to be the graph with vertex set SnS_n and two vertices g,hg,h of F(n,k)\mathcal{F}(n,k) are joined by an edge, if and only if gh1gh^{-1} fixes exactly kk points. Ku, Lau and Wong [Cayley graph on symmetric group generated by elements fixing kk points, Linear Algebra Appl. 471 (2015) 405-426] obtained a recursive formula for the eigenvalues of F(n,k)\mathcal{F}(n,k). In this paper, we use objects called excited diagrams defined as certain generalizations of skew shapes and derive an explicit formula for the eigenvalues of Cayley graph F(n,k)\mathcal{F}(n,k). Then we apply this formula and show that the eigenvalues of F(n,k)\mathcal{F}(n,k) are in the interval [S(n,k)nk1,S(n,k)][\frac{-|S(n,k)|}{n-k-1}, |S(n,k)|], where S(n,k)S(n,k) is the set of elements σ\sigma of SnS_n such that σ\sigma fixes exactly kk points.

Keywords

Cite

@article{arxiv.2302.00929,
  title  = {A hook formula for eigenvalues of k-point fixing graph},
  author = {Mahdi Ebrahimi},
  journal= {arXiv preprint arXiv:2302.00929},
  year   = {2023}
}
R2 v1 2026-06-28T08:29:59.115Z