On a problem of M. Talagrand

TL;DR

This paper proves a special case of Talagrand's conjecture, demonstrating that certain threshold properties hold when the measure is supported on pairs, advancing understanding of threshold phenomena in combinatorics.

Contribution

The authors prove Talagrand's conjecture for the case where the measure is supported on pairs, extending previous results limited to singleton support.

Findings

Proved Talagrand's conjecture for pair-supported measures.

Established bounds relating weakly p-small and (p/L)-small families.

Enhanced understanding of threshold behaviors in combinatorial families.

Abstract

We address a special case of a conjecture of M. Talagrand relating two notions of "threshold" for an increasing family $\mathcal F$ of subsets of a finite set $V$. The full conjecture implies equivalence of the "Fractional Expectation-Threshold Conjecture," due to Talagrand and recently proved by the authors and B. Narayanan, and the (stronger) "Expectation-Threshold Conjecture" of the second author and G. Kalai. The conjecture under discussion here says there is a fixed $L$ such that if, for a given $\mathcal F$, $p\in [0,1]$ admits $\lambda:2^V \rightarrow \mathbb R^+$ with \[ \mbox{$\sum_{S\subseteq F}\lambda_S\ge 1 ~~\forall F\in \mathcal F$} \] and \[ \mbox{$\sum_S\lambda_Sp^{|S|} \le 1/2$} \] (a.k.a. $\mathcal F$ is weakly $p$-small), then $p/L$ admits such a $\lambda$ taking values in $\{0,1\}$ ($\mathcal F$ is $(p/L)$-small). Talagrand showed this when $\lambda$ is supported on singletons and suggested, as a more challenging test case, proving it when $\lambda$ is supported on pairs. The present work provides such a proof.