Mixed weak estimates of Sawyer type for fractional integrals and some related operators

Abstract

We prove mixed weak estimates of Sawyer type for fractional operators. More precisely, let T be either the maximal fractional function Mγ or the fractional integral operator Iγ, 0<γ<n, 1≤ p<n/γ and 1/q=1/p-γ/n. If u,vq/p∈ A1 or if uv-q/p'∈ A1 and vq∈ A∞(uv-q/p') then we obtain that the estimate equation* uvq/p(\x∈ n: |T(fv)(x)|v(x)>t\)1/q≤ Ct(∫n|f(x)|pu(x)p/qv(x)\,dx)1/p, equation* holds for every positive t and every bounded function with compact support. As an important application of the results above we further more exhibe mixed weak estimates for commutators of Calder\'on-Zygmund singular integral and fractional integral operators when the symbol b is in the class Lipschitz-δ, 0<δ≤ 1.