Induced subgraphs of graphs with large chromatic number. XIII. New brooms

Abstract

Gy\'arf\'as and Sumner independently conjectured that for every tree T, the class of graphs not containing T as an induced subgraph is -bounded, that is, the chromatic numbers of graphs in this class are bounded above by a function of their clique numbers. This remains open for general trees T, but has been proved for some particular trees. For k 1, let us say a broom of length k is a tree obtained from a k-edge path with ends a,b by adding some number of leaves adjacent to b, and we call a its handle. A tree obtained from brooms of lengths k1,...,kn by identifying their handles is a (k1,...,kn)-multibroom. Kierstead and Penrice proved that every (1,...,1)-multibroom T satisfies the Gy\'arf\'as-Sumner conjecture, and Kierstead and Zhu proved the same for (2,...,2)-multibrooms. In this paper give a common generalization: we prove that every (1,...,1,2,...,2)-multibroom satisfies the Gy\'arf\'as-Sumner conjecture.