A degree version of the Burr-Erdős conjecture on trees

Abstract

An old conjecture of Burr and Erd os states that the Ramsey number of any n-vertex tree T is at most 2n-2. In 2012, Schelp asked whether a degree version of the Burr--Erdős conjecture holds. More precisely, Schelp asked if is it true that for any >0 and Δ 2, if G is a graph on N (2+)n vertices and minimum degree δ(G) 3N/4, then every blue/red colouring of the edges of G yields a monochromatic copy of each n-vertex tree with maximum degree at most Δ. We prove this conjecture in a strong form, showing that it is true even if one removes the extra n term in the size of the host graph.