Improvements on Sawyer type estimates for generalized maximal functions

Abstract

In this paper we prove mixed inequalities for the maximal operator M, for general Young functions with certain additional properties, improving and generalizing some previous estimates for the Hardy-Littlewood maximal operator proved by E. Sawyer. We show that given r≥ 1, if u,vr are weights belonging to the A1-Muckenhoupt class and is a Young function as above, then the inequality \[uvr(\x∈ Rn: M(fv)(x)v(x)>t\)≤ C∫Rn(|f(x)|t)u(x)vr(x)\,dx\] holds for every positive t. A motivation for studying these type of estimates is to find an alternative way to prove the boundedness properties of M. Moreover, it is well-known that for the particular case (t)=t(1++t)m with m∈N these maximal functions control, in some sense, certain operatos in Harmonic Analysis.