On 3-colourability of (bull, H)-free graphs
Abstract
The 3-colourability problem is a well-known NP-complete problem and it remains NP-complete for bull-free graphs, where bull is the graph consisting of K3 with two pendant edges attached to two of its vertices. In this paper we study 3-colourability of (bull,H)-free graphs for several graphs H. We show that these graphs are 3-colourable or contain an induced odd wheel W2p+1 for some p≥ 2 or a spindle graph M3p+1 for some p≥ 1. Moreover, for all our results we can provide certifying algorithms that run in polynomial time.
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