Subcubic K4-minor-free graphs without crumby colorings

Abstract

Motivated by Wegner's conjecture on squares of planar graphs, Thomassen conjectured that every 3-connected cubic graph on at least eight vertices admits a red-blue vertex coloring in which the blue subgraph has maximum degree at most 1, while the red subgraph has minimum degree at least 1 and contains no P4. Such colorings are now called crumby colorings. Although this conjecture was disproved in general by Bellitto, Klimosov\'a, Merker, Witkowski and Yuditsky, positive results of Bar\'at, Bl\'azsik and Dam\'asdi led them, in the same subcubic setting, to conjecture that every K4-minor-free graph admits a crumby coloring. We disprove this conjecture with a connected subcubic partial 2-tree on 18 vertices. We also disprove its natural 2-connected version with a 2-connected subcubic partial 2-tree on 40 vertices with no crumby coloring. Consequently, the obstruction to crumby colorability already occurs within treewidth two, even under 2-connectivity.