Coloring graphs with forbidden almost bipartite subgraphs

Abstract

Alon, Krivelevich, and Sudakov conjectured in 1999 that for every finite graph F, there exists a quantity c(F) such that (G) ≤ (c(F) + o(1)) / whenever G is an F-free graph of maximum degree . The largest class of connected graphs F for which this conjecture has been verified so far, by Alon, Krivelevich, and Sudakov themselves, comprises the almost bipartite graphs (i.e., subgraphs of the complete tripartite graph K1,t,t for some t ∈ N). However, the optimal value for c(F) remains unknown even for such graphs. Bollob\'as showed, using random regular graphs, that c(F) ≥ 1/2 when F contains a cycle. On the other hand, Davies, Kang, Pirot, and Sereni recently established an upper bound of c(K1,t,t) ≤ t. We improve this to a uniform constant, showing c(F) ≤ 4 for every almost bipartite graph F. This surprisingly makes the bound independent of F in all the known cases of the conjecture. We also establish a more general version of our bound in the setting of DP-coloring (also known as correspondence coloring) and consider some algorithmic consequences of our results.