Distinct degrees in induced subgraphs

Abstract

An important theme of recent research in Ramsey theory has been establishing pseudorandomness properties of Ramsey graphs. An N-vertex graph is called C-Ramsey if it has no homogeneous set of size C N. A theorem of Bukh and Sudakov, solving a conjecture of Erdos, Faudree and S\'os, shows that any C-Ramsey N-vertex graph contains an induced subgraph with C(N1/2) distinct degrees. We improve this to C(N2/3), which is tight up to the constant factor. We also show that any N-vertex graph with N > (k-1)(n-1) and n≥ n0(k) = (k9) either contains a homogeneous set of order n or an induced subgraph with k distinct degrees. The lower bound on N here is sharp, as shown by an appropriate Tur\'an graph, and confirms a conjecture of Narayanan and Tomon.