Edge-colouring and orientations: applications to degree- and -boundedness

Abstract

We prove a new generalisation of Ramsey's theorem by showing that every 2-edge-coloured graph with sufficiently large minimum degree contains a monochromatic induced subgraph whose minimum degree remains large. From this, we also derive that every orientation of a graph with large minimum degree contains either a large transitive tournament or an induced antidirected digraph whose minimum degree is still large. As a consequence, we obtain two general tools showing that certain extensions of degree-bounded graph classes preserve degree-boundedness. A hereditary class G is degree-bounded if, for every integer s, there exists d=d(s) such that every graph G∈ G either contains Ks,s or has minimum degree at most d. With these tools, we obtain for instance that odd-signable graphs and Burling graphs are degree-bounded. We also characterise exactly the oriented graphs F such that the graphs admitting an orientation without any induced copy of F are degree-bounded.