Functional van den Berg-Kesten-Reimer Inequalities and their Duals, with Applications

Abstract

The BKR inequality conjectured by van den Berg and Kesten in [11], and proved by Reimer in [8], states that for A and B events on S, a finite product of finite sets Si,i=1,…,n, and P any product measure on S, P(A B) P(A)P(B), where the set A B consists of the elementary events which lie in both A and B for `disjoint reasons.' Precisely, with n:=\1,…,n\ and K ⊂ n, for x ∈ S letting [ x]K=\ y ∈ S: yi = xi, i ∈ K\, the set A B consists of all x ∈ S for which there exist disjoint subsets K and L of n for which [ x]K ⊂ A and [ x]L ⊂ B. The BKR inequality is extended to the following functional version on a general finite product measure space (S,S) with product probability measure P, E\ K L = K ⊂ n, L ⊂ n fK( X)gL( X)\ ≤ E\f( X)\\,E\g( X)\, where f and g are non-negative measurable functions, fK( x) = ess ∈f y ∈ [ x]Kf( y) and gL( x) = ess ∈f y ∈ [ x]Lg( y). The original BKR inequality is recovered by taking f( x)= 1A( x) and g( x)= 1B( x), and applying the fact that in general 1A B K L = fK( x) gL( x). Related formulations, and functional versions of the dual inequality on events by Kahn, Saks, and Smyth [6], are also considered. Applications include order statistics, assignment problems, and paths in random graphs.