Coloring the squares of graphs whose maximum average degrees are less than 4

Abstract

The square G2 of a graph G is the graph defined on V(G) such that two vertices u and v are adjacent in G2 if the distance between u and v in G is at most 2. The maximum average degree of G, mad (G), is the maximum among the average degrees of the subgraphs of G. It is known in BLP-14-JGT that there is no constant C such that every graph G with mad(G)< 4 has (G2) ≤ (G) + C. Charpentier Charpentier14 conjectured that there exists an integer D such that every graph G with (G) D and mad(G)<4 has (G2) ≤ 2 (G). Recent result in BLP-DM implies that (G2) ≤ 2 (G) if mad(G) < 4 -1c with (G) ≥ 40c -16. In this paper, we show for c 2, if mad(G) < 4 - 1c and (G) ≥ 14c-7, then (G2) ≤ 2 (G), which improves the result in BLP-DM. We also show that for every integer D, there is a graph G with (G) D such that mad(G)<4, and (G2) ≥ 2(G) +2, which disproves Charpentier's conjecture. In addition, we give counterexamples to Charpentier's another conjecture in Charpentier14, stating that for every integer k 3, there is an integer Dk such that every graph G with mad(G)<2k and (G) Dk has (G2) ≤ k(G) -k.