Flexible List Colorings in Graphs with Special Degeneracy Conditions

Abstract

For a given > 0, we say that a graph G is -flexibly k-choosable if the following holds: for any assignment L of color lists of size k on V(G), if a preferred color from a list is requested at any set R of vertices, then at least |R| of these requests are satisfied by some L-coloring. We consider the question of flexible choosability in several graph classes with certain degeneracy conditions. We characterize the graphs of maximum degree that are -flexibly -choosable for some = () > 0, which answers a question of Dvor\'ak, Norin, and Postle [List coloring with requests, JGT 2019]. In particular, we show that for any ≥ 3, any graph of maximum degree that is not isomorphic to K+1 is 16-flexibly -choosable. Our fraction of 16 is within a constant factor of being the best possible. We also show that graphs of treewidth 2 are 13-flexibly 3-choosable, answering a question of Choi et al.~[arXiv 2020], and we give conditions for list assignments by which graphs of treewidth k are 1k+1-flexibly (k+1)-choosable. We show furthermore that graphs of treedepth k are 1k-flexibly k-choosable. Finally, we introduce a notion of flexible degeneracy, which strengthens flexible choosability, and we show that apart from a well-understood class of exceptions, 3-connected non-regular graphs of maximum degree are flexibly ( - 1)-degenerate.