Counting critical subgraphs in k-critical graphs

Abstract

Gallai asked in 1984 if any k-critical graph on n vertices contains at least n distinct (k-1)-critical subgraphs. The answer is trivial for k≤ 3. Improving a result of Stiebitz, Abbott and Zhou proved in 1995 that for all k≥ 4, such graph contains (n1/(k-1)) distinct (k-1)-critical subgraphs. Since then no progress had been made until very recently, Hare resolved the case k=4 by showing that any 4-critical graph on n vertices contains at least (8n-29)/3 odd cycles. In this paper, we mainly focus on 4-critical graphs and develop some novel tools for counting cycles of specified parity. Our main result shows that any 4-critical graph on n vertices contains (n2) odd cycles, which is tight up to a constant factor by infinite many graphs. As a crucial step, we prove the same bound for 3-connected non-bipartite graphs, which may be of independent interest. Using the tools, we also give a very short proof for the case k=4. Moreover, we improve the longstanding lower bound of Abbott and Zhou to (n1/(k-2)) for the general case k≥ 5. We will also discuss some related problems on k-critical graphs in the final section.