On the "second" Kahn--Kalai Conjecture

Abstract

We make progress on a conjecture of Kahn and Kalai, the original (stronger but less general) version of what became known as the ``Kahn-Kalai Conjecture" (KKC; now a theorem of Park and Pham). This ``second" KKC concerns the threshold, pc(H), for Gn,p to contain a copy of a given graph H, predicting pc(H) = O(p E(H) n), where p E is an easy lower bound on pc. What we actually show is p E*(H)=O(p E(H) 2n), where p E*, the fractional expectation threshold, is a larger lower bound suggested by Talagrand. When combined with Talagrand's fractional relaxation of the KKC (now a theorem of Frankston, Kahn, Narayanan and Park), this gives pc(H)=O(p E(H)3 n). (The second KKC would follow similarly if one could remove the log factors from the above bound on p E*.)