Online Graph Coloring for $k$-Colorable Graphs
Abstract
We study the problem of online graph coloring for -colorable graphs. The best previously known deterministic algorithm uses colors for general and colors for , both given by Kierstead in 1998. In this paper, we finally break this barrier, achieving the first major improvement in nearly three decades. Our results are summarized as follows: (1) case. We provide a deterministic online algorithm to color -colorable graphs with colors, significantly improving the current upper bound of colors. Our algorithm also matches the best-known bound for ( colors). (2) case. We provide a deterministic online algorithm to color -colorable graphs with colors, improving the current upper bound of colors. (3) case. We show that for randomized algorithms, the upper bound is colors and the lower bound is colors. This means that we close the gap to a factor of . With our algorithm for the case, we also obtain a deterministic online algorithm for graph coloring that achieves a competitive ratio of , which improves the best-known result of by Kierstead. For the bipartite graph case (), the limit of online deterministic algorithms is known: any deterministic algorithm requires colors. Our results imply that randomized algorithms can perform slightly better but still have a limit.
Keywords
Cite
@article{arxiv.2511.16100,
title = {Online Graph Coloring for $k$-Colorable Graphs},
author = {Ken-ichi Kawarabayashi and Hirotaka Yoneda and Masataka Yoneda},
journal= {arXiv preprint arXiv:2511.16100},
year = {2026}
}