On directional maximal operators in higher dimensions

Abstract

We introduce a notion of (finite order) lacunarity in higher dimensions for which we can bound the associated directional maximal operators in Lp(Rn), with p>1. In particular, we are able to treat the classes previously considered by Nagel--Stein--Wainger, Sj\"ogren--Sj\"olin and Carbery. Closely related to this, we find a characterisation of the sets of directions which give rise to bounded maximal operators. The bounds enable Lebesgue type differentiation of integrals in Llocp(Rn), replacing balls by tubes which point in these directions.