Clustered Variants of Haj\'os' Conjecture

Abstract

Haj\'os conjectured that every graph containing no subdivision of the complete graph Ks+1 is properly s-colorable. This conjecture was disproved by Catlin. Indeed, the maximum chromatic number of such graphs is (s2/ s). We prove that O(s) colors are enough for a weakening of this conjecture that only requires every monochromatic component to have bounded size (so-called clustered coloring). Our approach leads to more results. Say that a graph is an almost (≤ 1)-subdivision of a graph H if it can be obtained from H by subdividing edges, where at most one edge is subdivided more than once. Note that every graph with no H-subdivision does not contain an almost (≤ 1)-subdivision of H. We prove the following (where s ≥ 2): (1) Graphs of bounded treewidth and with no almost (≤ 1)-subdivision of Ks+1 are s-choosable with bounded clustering. (2) For every graph H, graphs with no H-minor and no almost (≤ 1)-subdivision of Ks+1 are (s+1)-colorable with bounded clustering. (3) For every graph H of maximum degree at most d, graphs with no H-subdivision and no almost (≤ 1)-subdivision of Ks+1 are \s+3d-5,2\-colorable with bounded clustering. (4) For every graph H of maximum degree d, graphs with no Ks,t subgraph and no H-subdivision are \s+3d-4,2\-colorable with bounded clustering. (5) Graphs with no Ks+1-subdivision are (4s-5)-colorable with bounded clustering. The first result shows that the weakening of Haj\'os' conjecture is true for graphs of bounded treewidth in a stronger sense; the final result is the first O(s) bound on the clustered chromatic number of graphs with no Ks+1-subdivision.