Automorphism group of the complete transposition graph

TL;DR

This paper investigates the automorphism group of the complete transposition graph, a Cayley graph of the symmetric group generated by all transpositions, and proves it is not a normal Cayley graph for all n ≥ 3.

Contribution

It determines the automorphism group of the complete transposition graph and proves that this graph is not a normal Cayley graph for all n ≥ 3.

Findings

Automorphism group is (R(S_n) ⋊ Inn(S_n)) ⋊ Z_2.

Complete transposition graph is not a normal Cayley graph.

Automorphism group includes inversion automorphism.

Abstract

The complete transposition graph is defined to be the graph whose vertices are the elements of the symmetric group $S_n$, and two vertices $\alpha$ and $\beta$ are adjacent in this graph iff there is some transposition $(i,j)$ such that $\alpha=(i,j) \beta$. Thus, the complete transposition graph is the Cayley graph $\Cay(S_n,S)$ of the symmetric group generated by the set $S$ of all transpositions. An open problem in the literature is to determine which Cayley graphs are normal. It was shown recently that the Cayley graph generated by 4 cyclically adjacent transpositions is not normal. In the present paper, it is proved that the complete transposition graph is not a normal Cayley graph, for all $n \ge 3$. Furthermore, the automorphism group of the complete transposition graph is shown to equal \[ \Aut(\Cay(S_n,S)) = (R(S_n) \rtimes \Inn(S_n)) \rtimes \mathbb{Z}_2, \] where $R(S_n)$ is the right regular representation of $S_n$, $\Inn(S_n)$ is the group of inner automorphisms of $S_n$, and $\mathbb{Z}_2 = \langle h \rangle$, where $h$ is the map $\alpha \mapsto \alpha^{-1}$.