Quasi-cliques in inhomogeneous random graphs

Abstract

Given a graph G and a constant γ ∈ [0,1], let ω(γ)(G) be the largest integer r such that there exists an r-vertex subgraph of G containing at least γ r2 edges. It was recently shown that ω(γ)(G) is highly concentrated when G is an Erdos-R\'enyi random graph (Balister, Bollob\'as, Sahasrabudhe, Veremyev, 2019). This paper provides a simple method to extend that result to a setting of inhomogeneous random graphs, showing that ω(γ)(G) remains concentrated on a small range of values even if G is an inhomogeneous random graph. Furthermore, we give an explicit expression for ω(γ)(G) and show that it depends primarily on the largest edge probability of the graph G.