A new bound for Vizing's conjecture

Abstract

For any graph G, we define the power π(G) as the minimum of the largest number of neighbors in a γ-set of G, of any vertex, taken over all γ-sets of G. We show that γ(G H)≥ π(G)2π(G) -1γ(G)γ(H). Our methods allow us to prove the following statements for any graphs G and H, (1) γ(G H)≥ γ (G)22 γ (G)2-1γ(G)γ(H) for odd γ(G), (2) γ(G H)≥ γ (G)2γ (G)-2γ(G)γ(H), for even γ(G), and (3) a short proof of Vizing's conjecture where γ(G)=3. Our argument relies on establishing efficient correspondences between dominating vertices and subsets of their neighborhoods and then showing a sufficient number of dominating vertices that horizontally dominate vertically undominated cells.