Date of Original Version

9-2014

Type

Article

Rights Management

The final publication is available at Springer via http://dx.doi.org/10.1007/s00493-014-3025-3

Abstract or Description

The first application of Szemerédi’s powerful regularity method was the following celebrated Ramsey-Turán result proved by Szemerédi in 1972: any K 4-free graph on n vertices with independence number o(n) has at most (18+o(1))n2 edges. Four years later, Bollobás and Erdős gave a surprising geometric construction, utilizing the isoperimetric inequality for the high dimensional sphere, of a K 4-free graph on n vertices with independence number o(n) and (18−o(1))n2 edges. Starting with Bollobás and Erdős 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 n 2/8. 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.

DOI

10.1007/s00493-014-3025-3

Included in

Mathematics Commons

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Published In

Combinatorica, 35, 4, 435-476.