Lacunary Discrete Spherical Maximal Functions
Abstract
We prove new bounds for discrete spherical averages in dimensions . We focus on the case of lacunary radii, first for general lacunary radii, and then for certain kinds of highly composite choices of radii. In particular, if is the spherical average of over the discrete sphere of radius , we have \begin{equation*} \bigl\lVert \sup _{k} \lvert A _{\lambda _k} f \rvert \bigr\rVert _{\ell ^{p} (\mathbb Z ^{d})} \lesssim \lVert f\rVert _{\ell ^{p} (\mathbb Z ^{d})}, \qquad \tfrac{d-2} {d-3} < p \leq \tfrac{d} {d-2},\ d\geq 5, \end{equation*} for any lacunary sets of integers . We follow a style of argument from our prior paper, addressing the full supremum. The relevant maximal operator is decomposed into several parts; each part requires only one endpoint estimate.
Cite
@article{arxiv.1810.12344,
title = {Lacunary Discrete Spherical Maximal Functions},
author = {Robert Kesler and Michael T. Lacey and Dario Mena},
journal= {arXiv preprint arXiv:1810.12344},
year = {2021}
}
Comments
13 pages, 1 Figure. v3. Section added to illustrate the proof technique in the continuous case. Final version, to appear in NYJM