Improved lower bounds on the number of edges in list critical and online list critical graphs

Abstract

We prove that every k-list-critical graph (k 7) on n k+2 vertices has at least 12 (k-1 + k-3(k-c)(k-1) + k-3)n edges where c = (k-3)(12 - 1(k-1)(k-2)). This improves the bound established by Kostochka and Stiebitz. The same bound holds for online k-list-critical graphs, improving the bound established by Riasat and Schauz. Both bounds follow from a more general result stating that either a graph has many edges or it has an Alon-Tarsi orientable induced subgraph satisfying a certain degree condition.