When do the Kahn-Kalai Bounds Provide Nontrivial Information?

Abstract

The Park-Pham theorem (previously known as the Kahn-Kalai conjecture), bounds the critical probability, pc(F), of the a non-trivial property F⊂eq 2X that is closed under supersets by the product of a universal constant K, the expectation threshold of the property, q(F), and the logarithm of the size of the property's largest minimal element, (F). That is, the Park-Pham theorem asserts that pc(F)≤ Kq(F)(F). Since the critical probability pc(F) always satisfies pc(F)<1, one may ask when the upper bound posed by Kahn and Kalai gives us more information than this--that is, when is it true that Kq(F)(F) < 1? In this short note, we provide a number of necessary conditions for this to happen and give a few sufficient conditions for the bounds to provide new (and, in fact, asymptotically perfect) information along the way. In the most interesting case where (Fn)→ ∞, we prove the following relatively strong necessary condition for the Kahn-Kalai bounds to provide nontrivial information: For every positive integer t, every collection of all-but-t of the minimal elements of Fn may have nonempty intersection for only finitely many n. Consequently, not only must the number of minimal elements become arbitrarily large, but so too must the size of any cover. Intuitively, this means that such sequences Fn must occupy an ever-widening `wedge' in 2Xn: the further Fn climbs up 2Xn in one area, the further it must spread down and across 2Xn in another.