Some new weighted estimates on product spaces

Abstract

We complete our theory of weighted Lp(w1) × Lq(w2) Lr(w1r/p w2r/q) estimates for bilinear bi-parameter Calder\'on--Zygmund operators under the assumption that w1 ∈ Ap and w2 ∈ Aq are bi-parameter weights. This is done by lifting a previous restriction on the class of singular integrals by extending a classical result of Muckenhoupt and Wheeden regarding weighted BMO spaces to the product BMO setting. We use this extension of the Muckenhoupt-Wheeden result also to generalise some two-weight commutator estimates from bi-parameter to multi-parameter. This gives a fully satisfactory Bloom type upper estimate for [T1, [T2, … [b, Tk]]], where each Ti can be a completely general multi-parameter Calder\'on--Zygmund operator.