English

Further progress towards Hadwiger's conjecture

Combinatorics 2022-05-19 v4 Discrete Mathematics

Abstract

In 1943, Hadwiger conjectured that every graph with no KtK_t minor is (t1)(t-1)-colorable for every t1t\ge 1. In the 1980s, Kostochka and Thomason independently proved that every graph with no KtK_t minor has average degree O(tlogt)O(t\sqrt{\log t}) and hence is O(tlogt)O(t\sqrt{\log t})-colorable. Recently, Norin, Song and the author showed that every graph with no KtK_t minor is O(t(logt)β)O(t(\log t)^{\beta})-colorable for every β>1/4\beta > 1/4, making the first improvement on the order of magnitude of the O(tlogt)O(t\sqrt{\log t}) bound. Building on that work, we show in this paper that every graph with no KtK_t minor is O(t(logt)β)O(t (\log t)^{\beta})-colorable for every β>0\beta > 0. More specifically in conjunction with another paper by the author, they are O(t(loglogt)18)O(t \cdot (\log \log t)^{18})-colorable.

Keywords

Cite

@article{arxiv.2006.11798,
  title  = {Further progress towards Hadwiger's conjecture},
  author = {Luke Postle},
  journal= {arXiv preprint arXiv:2006.11798},
  year   = {2022}
}

Comments

Merged into arXiv:2108.01633

R2 v1 2026-06-23T16:29:45.951Z