Logarithmic bump conditions and the two weight boundedness of Calder\'on-Zygmund operators

Abstract

We prove that if a pair of weights (u,v) satisfies a sharp Ap-bump condition in the scale of log bumps and certain loglog bumps, then Haar shifts map Lp(v) into Lp(u) with a constant quadratic in the complexity of the shift. This in turn implies the two weight boundedness for all Calder\'on-Zygmund operators. This gives a partial answer to a long-standing conjecture. We also give a partial result for a related conjecture for weak-type inequalities. To prove our main results we combine several different approaches to these problems; in particular we use many of the ideas developed to prove the A2 conjecture. As a byproduct of our work we also disprove a conjecture by Muckenhoupt and Wheeden on weak-type inequalities for the Hilbert transform. This is closely related to the recent counterexamples of Reguera, Scurry and Thiele.