Weighted estimates for the multilinear maximal function on the upper half-spaces

TL;DR

This paper develops a Calderón-Zygmund decomposition for the multilinear maximal function on upper half-spaces and explores its boundedness, extending classical weighted inequalities to a multilinear setting with new characterizations.

Contribution

It introduces a Calderón-Zygmund decomposition for multilinear maximal functions and extends Muckenhoupt's weak and strong-type inequalities to this setting.

Findings

Established a Calderón-Zygmund decomposition for multilinear maximal functions.

Extended Muckenhoupt's weak-type characterization to the multilinear context.

Derived partial characterizations of strong-type inequalities and multilinear Sawyer's theorem.

Abstract

For a general dyadic grid, we give a Calder\'{o}n-Zygmund type decomposition, which is the principle fact about the multilinear maximal function $\mathfrak{M}$ on the upper half-spaces. Using the decomposition, we study the boundedness of $\mathfrak{M}.$ We obtain a natural extension to the multilinear setting of Muckenhoupt's weak-type characterization. We also partially obtain characterizations of Muckenhoupt's strong-type inequalities with one weight. Assuming the reverse H\"{o}lder's condition, we get a multilinear analogue of Sawyer's two weight theorem. Moreover, we also get Hyt\"{o}nen-P\'{e}rez type weighted estimates.