On the Second Kahn--Kalai Conjecture

Abstract

For any given graph H, we are interested in pcrit(H), the minimal p such that the Erdos-R\'enyi graph G(n,p) contains a copy of H with probability at least 1/2. Kahn and Kalai (2007) conjectured that pcrit(H) is given up to a logarithmic factor by a simpler "subgraph expectation threshold" pE(H), which is the minimal p such that for every subgraph H'⊂eq H, the Erdos-R\'enyi graph G(n,p) contains in expectation at least 1/2 copies of H'. It is trivial that pE(H) pcrit(H), and the so-called "second Kahn-Kalai conjecture" states that pcrit(H) pE(H) e(H) where e(H) is the number of edges in H. In this article, we present a natural modification pE, new(H) of the Kahn--Kalai subgraph expectation threshold, which we show is sandwiched between pE(H) and pcrit(H). The new definition pE, new(H) is based on the simple observation that if G(n,p) contains a copy of H and H contains many copies of H', then G(n,p) must also contain many copies of H'. We then show that pcrit(H) pE, new(H) e(H), thus proving a modification of the second Kahn--Kalai conjecture. The bound follows by a direct application of the set-theoretic "spread" property, which led to recent breakthroughs in the sunflower conjecture by Alweiss, Lovett, Wu and Zhang and the first fractional Kahn--Kalai conjecture by Frankston, Kahn, Narayanan and Park.