A hook formula for eigenvalues of k-point fixing graph
Combinatorics
2023-02-03 v1 Group Theory
Abstract
Let denote the symmetric group on letters. The -point fixing graph is defined to be the graph with vertex set and two vertices of are joined by an edge, if and only if fixes exactly points. Ku, Lau and Wong [Cayley graph on symmetric group generated by elements fixing points, Linear Algebra Appl. 471 (2015) 405-426] obtained a recursive formula for the eigenvalues of . 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 . Then we apply this formula and show that the eigenvalues of are in the interval , where is the set of elements of such that fixes exactly 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}
}