Cayley graphs formed by conjugate generating sets of S_n

TL;DR

This paper characterizes minimal conjugate generating sets of the symmetric group S_n, explores automorphism groups of Cayley graphs formed by these sets, and investigates Hamiltonian properties of such graphs.

Contribution

It provides a new characterization of minimal conjugate generating sets of S_n and generalizes existing results on automorphism groups of Cayley graphs.

Findings

Characterization of minimal conjugate generating sets of S_n

Automorphism groups of Cayley graphs under certain conditions

Results on Hamiltonicity and quasi-Hamiltonicity of Cayley graphs

Abstract

We investigate subsets of the symmetric group with structure similar to that of a graph. The trees of these subsets correspond to minimal conjugate generating sets of the symmetric group. There are two main theorems in this paper. The first is a characterization of minimal conjugate generating sets of S_n. The second is a generalization of a result due to Feng characterizing the automorphism groups of the Cayley graphs formed by certain generating sets composed of cycles. We compute the full automorphism groups subject to a weak condition and conjecture that the characterization still holds without the condition. We also present some computational results in relation to hamiltonicity of Cayley graphs, including a generalization of the work on quasi-hamiltonicity by Gutin and Yeo to undirected graphs.