Mixed weak estimates of Sawyer type for generalized maximal operators

Abstract

We study mixed weak estimates of Sawyer type for maximal operators associated to the family of Young functions (t)=tr(1++t)δ, where r≥ 1 and δ≥ 0. More precisely, if u and vr are A1 weights, and w is defined as w=1/(v-1) then the following estimate \[uw(\x∈ Rn: M(fv)(x)v(x) > t\) ≤ C∫Rn (|f(x)|v(x)t)u(x) \,dx\] holds for every positive t. This extends mixed estimates to a wider class of maximal operators, since when we put r=1 and δ=0 we recover a previous result for the Hardy-Littlewood maximal operator. This inequality generalizes some previous results proved by Cruz Uribe, Martell and P\'erez in (Int. Math. Res. Not. (30): 1849-1871, 2005). Moreover, it includes estimates for some maximal operators related with commutators of Calder\'on-Zygmund operators.