(1, k)-coloring of graphs with girth at least 5 on a surface

Abstract

A graph is (d1, ..., dr)-colorable if its vertex set can be partitioned into r sets V1, ..., Vr so that the maximum degree of the graph induced by Vi is at most di for each i∈ \1, ..., r\. For a given pair (g, d1), the question of determining the minimum d2=d2(g; d1) such that planar graphs with girth at least g are (d1, d2)-colorable has attracted much interest. The finiteness of d2(g; d1) was known for all cases except when (g, d1)=(5, 1). Montassier and Ochem explicitly asked if d2(5; 1) is finite. We answer this question in the affirmative with d2(5; 1)≤ 10; namely, we prove that all planar graphs with girth at least 5 are (1, 10)-colorable. Moreover, our proof extends to the statement that for any surface S of Euler genus γ, there exists a K=K(γ) where graphs with girth at least 5 that are embeddable on S are (1, K)-colorable. On the other hand, there is no finite k where planar graphs (and thus embeddable on any surface) with girth at least 5 are (0, k)-colorable.