English

Cayley graph on symmetric groups with generating block transposition sets

Combinatorics 2015-04-03 v2

Abstract

This paper deals with the Cayley graph \Cay,\Cay, where the generating set consists of all block transpositions. A motivation for the study of these particular Cayley graphs comes from current research in Bioinformatics. We prove that Aut(\Cay){\rm{Aut}}(\Cay) is the product of the right translation group by NDn+1,\textsf{N}\rtimes \textsf{D}_{n+1}, where N\textsf{N} is the subgroup fixing SnS_n element-wise and Dn+1\textsf{D}_{n+1} is a dihedral group of order 2(n+1)2(n+1). We conjecture that N\textsf{N} is trivial. We also prove that the subgraph Γ\Gamma with vertex-set SnS_n is a 2(n2)2(n-2)-regular graph whose automorphism group is Dn+1\textsf{D}_{n+1}. Furthermore, Γ\Gamma has as many as n+1n+1 maximum cliques of size 2.2. Also, its subgraph Γ(V)\Gamma(V) whose vertices are those in these cliques is a 33-regular, Hamiltonian, and vertex-transitive graph.

Keywords

Cite

@article{arxiv.1410.8166,
  title  = {Cayley graph on symmetric groups with generating block transposition sets},
  author = {Annachiara Korchmaros},
  journal= {arXiv preprint arXiv:1410.8166},
  year   = {2015}
}
R2 v1 2026-06-22T06:40:59.595Z