Two Weight Inequalities for Positive Operators: Doubling Cubes

Abstract

For the maximal operator M on R d, and 1< p , < ∞ , there is a finite constant D = D p, so that this holds. For all weights w, σ on R d, the operator M (σ · ) is bounded from L p (σ ) L p (w) if and only the pair of weights (w, σ ) satisfy the two weight A p condition, and this testing inequality holds: equation* ∫ Q M (σ 1Q ) p \; d w σ ( Q), equation* for all cubes Q for which there is a cube P ⊃ Q satisfying σ (P) < D σ (Q), and P = Q. This was recently proved by Kangwei Li and Eric Sawyer. We give a short proof, which is easily seen to hold for several closely related operators.