Independent Sets in Direct Products of Vertex-transitive Graphs

Abstract

The direct product G× H of graphs G and H is defined by: \[V(G× H)=V(G)× V(H)\] and \[E(G× H)=\[(u1,v1),(u2,v2)]: (u1,u2)∈ E(G) \ and\ (v1,v2)∈ E(H)\.\] In this paper, we will prove that the equality α(G× H)=\α(G)|H|, α(H)|G|\ holds for all vertex-transitive graphs G and H, which provides an affirmative answer to a problem posed by Tardif (Discrete Math. 185 (1998) 193-200). Furthermore, the structure of all maximum independent sets of G× H are determined.