Kakeya-type sets for Geometric Maximal Operators

TL;DR

This paper introduces a new approach to analyze planar directional maximal operators using Kakeya-type sets, providing a complete characterization of their boundedness on L p spaces for arbitrary angle sets.

Contribution

It introduces the analytic split concept for families of rectangles and characterizes the boundedness of rarefied directional maximal operators on L p spaces.

Findings

The analytic split λ[G] satisfies a specific inequality involving the Hardy-Littlewood maximal operator.

Rarefied directional bases have the same L p-behavior as the full directional basis for 1 < p < ∞.

Complete characterization of boundedness for planar rarefied directional maximal operators.

Abstract

Given a family G of rectangles, to which one associates a tree [G], one defines a natural number $\lambda$ [G] called its analytic split and satisfying, for all 1 < p < $\infty$ log($\lambda$ [G]) p MG p p where MG is the Hardy-Littlewood type maximal operator associated to the family G. As an application, we completely characterize the boundeness of planar rarefied directional maximal operators on L p for 1 < p < $\infty$. Precisely, if $\Omega$ is an arbitrary set of angles in [0, $\pi$ 4), we prove that any rarefied basis B of the directional basis R $\Omega$ yields an operator MB that has the same L p-behavior than the directional maximal operator M $\Omega$ for 1 < p < $\infty$.