Square functions and the Hamming cube: Duality
Abstract
For 1<p≤ 2, any n≥ 1 and any f:\-1,1\n R, we obtain (E |∇ f|p)1/p ≥ C(p)(E|f|p - |Ef|p)1/p where C(p) is the smallest positive zero of the confluent hypergeometric function 1F1(p2(1-p), 12, x22). Our approach is based on a certain duality between the classical square function estimates on the Euclidean space and the gradient estimates on the Hamming cube.
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