Two Weight Inequalities for Riesz Transforms: Uniformly Full Dimension Weights

Abstract

Fix an integer n and number d, 0< d≠ n-1 ≤ n, and two weights w and σ on R n. We two extra conditions (1) no common point masses and (2) the two weights separately are not concentrated on a set of codimension one, uniformly over locations and scales. (This condition holds for doubling weights.) Then, we characterize the two weight inequality for the d-dimensional Riesz transform on R n, equation* 0< a < b < ∞ ∫a < x-y < b f (y) x-y x-y d+1 \; σ (dy) L 2 (Rn;w) N fL 2 (Rn;σ) equation* in terms of these two conditions, and their duals: For finite constants A2 and T, uniformly over all cubes Q⊂ R n gather* w (Q) Q d/n ∫ R n Q d/n Q 2d/n +dist(x, Q) 2d/n \; σ (dx) ≤ A2 \\ ∫Q Rσ 1Q (x) 2 \; w(dx) T 2 σ (Q), gather* where Rσ denotes any of the truncations of the Riesz transform as above, the dual conditions are obtained by interchanging the roles of the two weights. Examples show that a key step of the proof fails in absence of the extra geometric condition imposed on the weights.