Chromatic thresholds for pairs of graphs

Abstract

The chromatic threshold of a graph H is the minimum-degree density above which every H-free graph has bounded chromatic number. We study a two-color Ramsey analogue: for graphs H1 and H2, we ask for the minimum-degree density above which every graph that admits a red-blue edge-coloring with no red copy of H1 and no blue copy of H2 has bounded chromatic number. We give a complete answer when both H1 and H2 are 3-chromatic. The threshold takes exactly one of the five values \[ 23, 57, 34, 79, 45, \] and we characterize precisely which pairs (H1,H2) give each value. The classification is determined by the ordinary chromatic thresholds of H1 and H2 and by their embeddability into a hierarchy of C5-type Ramsey configurations.