Some Exact Ramsey-Tur\'an Numbers

Abstract

Let r be an integer, f(n) a function, and H a graph. Introduced by Erdos, Hajnal, S\'os, and Szemer\'edi, the r-Ramsey-Tur\'an number of H, RTr(n, H, f(n)), is defined to be the maximum number of edges in an n-vertex, H-free graph G with αr(G) <= f(n) where αr(G) denotes the Kr-independence number of G. In this note, using isoperimetric properties of the high dimensional unit sphere, we construct graphs providing lower bounds for RTr(n,Kr+s,o(n)) for every 2 <= s <= r. These constructions are sharp for an infinite family of pairs of r and s. The only previous sharp construction was by Bollob\'as and Erd for r = s = 2.