Two Ramsey-Tur\'an numbers involving triangles

Abstract

Given integers p, q2, we say that a graph G is (Kp,Kq)-free if there exists a red/blue edge coloring of G such that it contains neither a red Kp nor a blue Kq. Fix a function f( n ), the Ramsey-Tur\'an number RT( n,p,q,f( n )) is the maximum number of edges in an n-vertex (Kp,Kq)-free graph with independence number at most f( n ). For any δ>0, let (p, q,δ ) = n ∞ RT(n,p, q,δ n)n2. We always call (p, q):= δ 0 (p, q,δ ) the Ramsey-Tur\'an density of Kp and Kq. In 1993, Erdos, Hajnal, Simonovits, S\'os and Szemer\'edi proposed to determine the value of (3,q) for q3, and they conjectured that for q 2, ( 3,2q - 1 ) = 12(1 - 1r(3,q) - 1). Recently, Kim, Kim and Liu (2019) conjectured that for q 2, ( 3,2q ) = 12( 1 - 1r( 3,q )). Erdos et al. (1993) determined (3,q) for q=3,4,5 and (4,4). There is no progress on the Ramsey-Tur\'an density (p, q) in the past thirty years. In this paper, we obtain (3,6)=512 and (3,7)=716. Moreover, we show that the corresponding asymptotically extremal structures are weakly stable, which answers a problem of Erdos et al. (1993) for the two cases.

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