The critical window for the classical Ramsey-Tur\'an problem

Abstract

The first application of Szemer\'edi's powerful regularity method was the following celebrated Ramsey-Tur\'an result proved by Szemer\'edi in 1972: any K4-free graph on N vertices with independence number o(N) has at most (1/8 + o(1)) N2 edges. Four years later, Bollob\'as and Erdos gave a surprising geometric construction, utilizing the isoperimetric inequality for the high dimensional sphere, of a K4-free graph on N vertices with independence number o(N) and (1/8 - o(1)) N2 edges. Starting with Bollob\'as and Erdos in 1976, several problems have been asked on estimating the minimum possible independence number in the critical window, when the number of edges is about N2 / 8. These problems have received considerable attention and remained one of the main open problems in this area. In this paper, we give nearly best-possible bounds, solving the various open problems concerning this critical window.