Cliques in the union of C4-free graphs

Abstract

Let B and R be two simple graphs with vertex set V, and let G(B,R) be the simple graph with vertex set V, in which two vertices are adjacent if they are adjacent in at least one of B and R. We prove that if B and R are two C4-free graphs on the same vertex set V and G(B,R) is the complete graph, then there exists an B-clique X, an R-clique Y and a clique Z in B and R, such that V=X Y Z. Further, if x∈ Z then x is one of the vertices of some double C5 in G(B,R). In particular, if also G(B,R) does not contains a double C5, then V is obedient. We obtain that if B and R are C4-free graphs then ω(G(B,R))≤ ω(B)+ω(R)+12(ω(B),ω(R)) and ω(G(B,R))≤ ω(B)+ω(R)+ω(H(B,R)) where H(B,R) is the simple graph with vertex set V, in which two vertices are adjacent if they are adjacent in B and R.