下来量设定阈值

Pub Date : 2021-12-15 DOI:10.1002/rsa.21148

Benjamin Gunby, Xiaoyu He, Bhargav P. Narayanan

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引用次数: 1

摘要

我们阐明了阈值与下集的期望阈值之间的关系。定性地说，我们的主要结果表明，在阈值和期望阈值之间存在多项式差距的下集;特别是，Kahn-Kalai和Talagrand关于上集的对数间隙预测(最近由Park-Pham和frankton - kahn - narayanan - park证明)不适用于下集。定量地，我们证明了[n]上的图的任何集合𝒢覆盖了[n]上的所有无三角形图族，满足不等式∑G∈𝒢exp(−δe(Gc)/n)0，这本质上是最佳可能的。

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Down‐set thresholds

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 ∑G∈𝒢exp(−δe(Gc)/n)<1/2 for some universal δ>0 , and this is essentially best‐possible.

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