Graph colorings with restricted bicolored subgraphs: I. Acyclic, star, and treewidth colorings

Abstract

We show that for any fixed integer m ≥ 1, a graph of maximum degree has a coloring with O((m+1)/m) colors in which every connected bicolored subgraph contains at most m edges. This result unifies previously known upper bounds on the number of colors sufficient for certain types of graph colorings, including star colorings, for which O(3/2) colors suffice, and acyclic colorings, for which O(4/3) colors suffice. Our proof uses a probabilistic method of Alon, McDiarmid, and Reed. This result also gives previously unknown upper bounds, including the fact that a graph of maximum degree has a proper coloring with O(9/8) colors in which every bicolored subgraph is planar, as well as a proper coloring with O(13/12) colors in which every bicolored subgraph has treewidth at most 3.