Sawyer-type inequalities for Lorentz spaces

Abstract

The Hardy-Littlewood maximal operator satisfies the classical Sawyer-type estimate Mfv L1,∞(uv) ≤ Cu,v f L1(u), where u∈ A1 and uv∈ A∞. We prove a novel extension of this result to the general restricted weak type case. That is, for p>1, u∈ Ap R, and uvp ∈ A∞, Mfv Lp,∞(uvp) ≤ Cu,v f Lp,1(u). From these estimates, we deduce new weighted restricted weak type bounds and Sawyer-type inequalities for the m-fold product of Hardy-Littlewood maximal operators. We also present an innovative technique that allows us to transfer such estimates to a large class of multi-variable operators, including m-linear Calder\'on-Zygmund operators, avoiding the A∞ extrapolation theorem and producing many estimates that have not appeared in the literature before. In particular, we obtain a new characterization of Ap R. Furthermore, we introduce the class of weights that characterizes the restricted weak type bounds for the multi(sub)linear maximal operator M, denoted by A P R, establish analogous bounds for sparse operators and m-linear Calder\'on-Zygmund operators, and study the corresponding multi-variable Sawyer-type inequalities for such operators and weights. Our results combine mixed restricted weak type norm inequalities, Ap R and A P R weights, and Lorentz spaces.