Distinct degrees and homogeneous sets II

Abstract

Given an n-vertex graph G, let (G) denote the size of a largest homogeneous set in G and let f(G) denote the maximal number of distinct degrees appearing in an induced subgraph of G. The relationship between these parameters has been well studied by several researchers over the last 40 years, beginning with Erdos, Faudree and S\'os in the Ramsey regime when (G) = O( n). Our main result here proves that any n-vertex graph G with (G) ≤ n1/2 satisfies align* f(G) ≥ [3] n2 (G) · n-o(1). align* This confirms a conjecture of the authors from a previous work, in which we addressed the (G) ≥ n1/2 regime. Together, these provide the complete extremal relationship between these parameters (asymptotically), showing that any n-vertex graph G satisfies align* ( f(G) · (G), f(G) 3 · (G) ) ≥ n1-o(1). align* This relationship is tight (up to the n-o(1) term) for all possible values of (G), from ( n ) to n, as demonstrated by appropriately generated Erdos - Renyi random graphs.