On the Automorphism Group of a Graph

Abstract

An automorphism of a graph G with n vertices is a bijective map φ from V(G) to itself such that φ(vi)φ(vj)∈ E(G) vi vj∈ E(G) for any two vertices vi and vj of G. Denote by G the group consisting of all automorphisms of G. As well-known, the structure of the action of G on V(G) is represented definitely by its block systems. On the other hand for each permutation σ on [n], there is a natural action on any vector v=(v1,v2,…,vn)t∈ Rn such that σv=(vσ-11,vσ-12,…,vσ-1 n)t. Accordingly, we actually have a permutation representation of G in Rn. In this paper, we establish the some connections between block systems of G and its irreducible representations, and by virtue of that we finally devise an algorithm outputting a generating set and all block systems of G within time nC n for some constant C.