Two weight inequalities for bilinear forms

Abstract

Let 1 p0<p,q <q0 ∞. Given a pair of weights (w,σ) and a sparse family S, we study the two weight inequality for the following bi-sublinear form \[ B(f, g)= ΣQ∈ S |f|p0Q 1p0 |g|q0'Q 1q0'λQ N\|f\|Lp(w)\|g\|Lq'(σ). \] When λQ=|Q| and p=q, Bernicot, Frey and Petermichl showed that B(f,g) dominates Tf, g for a large class of singular non-kernel operators. We give a characterization for the above inequality and then obtain the mixed Ap-A∞ estimates and the corresponding entropy bounds when λQ=|Q| and p=q. We also proposed a new conjecture which implies both the one supremum conjecture and the separated bump conjecture.