The KKL inequality and Rademacher type 2
Abstract
We show that a vector-valued Kahn--Kalai--Linial inequality holds in every Banach space of Rademacher type 2. We also show that for any nondecreasing function h≥ 0 with 0<∫1∞h(t)t2dt<∞ we have the inequality align* \|f - Ef\|2 ≤ 12 \, T2(X) (∫1∞h(t)t2 dt )1/2 \, (Σj=1n \|Dj f\|22h( \|Dj f\|2\|Dj f\|1 ))1/2 align* for all f :\-1,1\n X and all n≥ 1, where X is a normed space and T2(X) is the associated type 2 constant.
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