Sparse 4-critical graphs have low circular chromatic number

Abstract

Kostochka and Yancey proved that every 4-critical graph G has e(G) ≥ 5v(G) - 23, and that equality holds if and only if G is 4-Ore. We show that a question of Postle and Smith-Roberge implies that every 4-critical graph with no (7,2)-circular-colouring has e(G) ≥ 27v(G) -2015. We prove that every 4-critical graph with no (7,2)-colouring has e(G) ≥ 17v(G)10 unless G is isomorphic to K4 or the wheel on six vertices. We also show that if the Gallai Tree of a 4-critical graph with no (7,2)-colouring has every component isomorphic to either an odd cycle, a claw, or a path. In the case that the Gallai Tree contains an odd cycle component, then G is isomorphic to an odd wheel. In general, we show a k-critical graph with no (2k-1,2)-colouring that contains a clique of size k-1 in it's Gallai Tree is isomorphic to Kk.