Down-set thresholds
Abstract
We elucidate the relationship between the threshold and the expectation-threshold of a down-set. Qualitatively, our main result demonstrates that there exist down-sets with polynomial gaps between their thresholds and expectation-thresholds; in particular, the logarithmic gap predictions of Kahn--Kalai and Talagrand (recently proved by Park--Pham and Frankston--Kahn--Narayanan--Park) about up-sets do not apply to down-sets. Quantitatively, we show that any collection G of graphs on [n] that covers the family of all triangle-free graphs on [n] satisfies the inequality ΣG ∈ G (-δ e(Gc) / n) < 1/2 for some universal δ > 0, and this is essentially best-possible.
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