On two problems in Ramsey-Tur\'an theory

Abstract

Alon, Balogh, Keevash and Sudakov proved that the (k-1)-partite Tur\'an graph maximizes the number of distinct r-edge-colorings with no monochromatic Kk for all fixed k and r=2,3, among all n-vertex graphs. In this paper, we determine this function asymptotically for r=2 among n-vertex graphs with sub-linear independence number. Somewhat surprisingly, unlike Alon-Balogh-Keevash-Sudakov's result, the extremal construction from Ramsey-Tur\'an theory, as a natural candidate, does not maximize the number of distinct edge-colorings with no monochromatic cliques among all graphs with sub-linear independence number, even in the 2-colored case. In the second problem, we determine the maximum number of triangles asymptotically in an n-vertex Kk-free graph G with α(G)=o(n). The extremal graphs have similar structure to the extremal graphs for the classical Ramsey-Tur\'an problem, i.e.~when the number of edges is maximized.