Two-weight Lp-Lq bounds for positive dyadic operators: unified approach to p≤ q and p>q

Abstract

We characterize the Lp(σ) Lq(ω) boundedness of positive dyadic operators of the form T(fσ)=ΣQ∈DλQ∫Q f\,dσ· 1Q, and the Lp1(σ1)× Lp2(σ2) Lq(ω) boundedness of their bilinear analogues, for arbitrary locally finite measures σ,σ1,σ2,ω. In the linear case, we unify the existing "Sawyer testing" (for p≤ q) and "Wolff potential" (for p>q) characterizations into a new "sequential testing" characterization valid in all cases. We extend these ideas to the bilinear case, obtaining both sequential testing and potential type characterizations for the bilinear operator and all p1,p2,q∈(1,∞). Our characterization covers the previously unknown case q<p1p2p1+p2, where we introduce a new two-measure Wolff potential.