A Two-Weight Boundedness Criterion and Its Applications

TL;DR

This paper develops a comprehensive two-weight boundedness criterion applicable to various operators and function spaces, providing a unified framework for establishing boundedness results in harmonic analysis.

Contribution

It introduces a new general two-weight boundedness criterion that simplifies proving boundedness of multiple operators across diverse function spaces.

Findings

Unified approach to boundedness of Calderón--Zygmund operators

Boundedness results for fractional integral operators

Extension to operators associated with elliptic PDEs

Abstract

In this article, the authors establish a general (two-weight) boundedness criterion for a pair of functions, $(F,f)$, on $\mathbb{R}^n$ in the scale of weighted Lebesgue spaces, weighted Lorentz spaces, (Lorentz--)Morrey spaces, and variable Lebesgue spaces. As applications, the authors give a unified approach to prove the (two-weight) boundedness of Calder\'on--Zygmund operators, Littlewood--Paley $g$-functions, Lusin area functions, Littlewood--Paley $g^\ast_\lambda$-functions, and fractional integral operators, in the aforementioned function spaces. Moreover, via applying the above (two-weight) boundedness criterion, the authors further obtain the (two-weight) boundedness of Riesz transforms, Littlewood--Paley $g$-functions, and fractional integral operators associated with second-order divergence elliptic operators with complex bounded measurable coefficients on $\mathbb{R}^n$ in the aforementioned function spaces.