Dichotomizing k-vertex-critical H-free graphs for H of order four

Abstract

For k ≥ 3, we prove (i) there is a finite number of k-vertex-critical (P2+ P1)-free graphs and (ii) k-vertex-critical (P3+P1)-free graphs have at most 2k-1 vertices. Together with previous research, these results imply the following characterization where H is a graph of order four: There is a finite number of k-vertex-critical H-free graphs for fixed k ≥ 5 if and only if H is one of K4, P4, P2 + 2P1, or P3 + P1. Our results imply the existence of new polynomial-time certifying algorithms for deciding the k-colorability of (P2+ P1)-free graphs for fixed k.