Mixed weak estimates of Sawyer type for commutators of singular integrals and related operators

Abstract

We study mixed weak type inequalities for the commutator [b,T], where b is a BMO function and T is a Calder\'on-Zygmund operator. More precisely, we prove that for every t>0 equation*%tesisteo2.2 uv(\x∈n: |[b,T](fv)(x)v(x)|>t\)≤ C∫nφ(|f(x)|t)u(x)v(x)\,dx, equation* where φ(t)=t(1++t), u∈ A1 and v∈ A∞(u). Our technique involves the classical Calder\'on-Zygmund decomposition, which allow us to give a direct proof. We use this result to prove an analogous inequality for higher order commutators. We also obtain a mixed estimation for a wide class of maximal operators associated to certain Young functions of L L type which are in intimate relation with the commutators. This last estimate involves an arbitrary weight u and a radial function v which is not even locally integrable.