Tree-chromatic number is not equal to path-chromatic number

Abstract

For a graph G and a tree-decomposition (T, B) of G, the chromatic number of (T, B) is the maximum of (G[B]), taken over all bags B ∈ B. The tree-chromatic number of G is the minimum chromatic number of all tree-decompositions (T, B) of G. The path-chromatic number of G is defined analogously. In this paper, we introduce an operation that always increases the path-chromatic number of a graph. As an easy corollary of our construction, we obtain an infinite family of graphs whose path-chromatic number and tree-chromatic number are different. This settles a question of Seymour. Our results also imply that the path-chromatic numbers of the Mycielski graphs are unbounded.