Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
420618 | Discrete Applied Mathematics | 2008 | 7 Pages |
An affine graph is a pair (G,σ)(G,σ) where G is a graph and σσ is an automorphism assigning to each vertex of G one of its neighbors. On one hand, we obtain a structural decomposition of any affine graph (G,σ)(G,σ) in terms of the orbits of σσ. On the other hand, we establish a relation between certain colorings of a graph G and the intersection graph of its cliques K(G)K(G). By using the results we construct new examples of expansive graphs. The expansive graphs were introduced by Neumann-Lara in 1981 as a stronger notion of the K-divergent graphs. A graph G is K-divergent if the sequence |V(Kn(G))||V(Kn(G))| tends to infinity with n , where Kn+1(G)Kn+1(G) is defined by Kn+1(G)=K(Kn(G))Kn+1(G)=K(Kn(G)) for n⩾1n⩾1. In particular, our constructions show that for any k⩾2k⩾2, the complement of the Cartesian product CkCk, where C is the cycle of length 2k+12k+1, is KK-divergent.