On an estimate of Calder\'on-Zygmund operators by dyadic positive operators

Abstract

Given a general dyadic grid D and a sparse family of cubes S=\Qjk\∈ D, define a dyadic positive operator AD, S by AD, Sf(x)=Σj,kfQjkQjk(x). Given a Banach function space X( Rn) and the maximal Calder\'on-Zygmund operator T, we show that \|Tf\|X c(n,T)D, S\| AD, Sf\|X. This result is applied to weighted inequalities. In particular, it implies: (i) the "two-weight conjecture" by D. Cruz-Uribe and C. P\'erez in full generality; (ii) a simplification of the proof of the "A2 conjecture"; (iii) an extension of certain mixed Ap-Ar estimates to general Calder\'on-Zygmund operators; (iv) an extension of sharp A1 estimates (known for T) to the maximal Calder\'on-Zygmund operator T.