The weak-type Carleson theorem via wave packet estimates
Abstract
We prove that the weak- norms, and in fact the sparse -norms, of the Carleson maximal partial Fourier sum operator are as . This is an improvement on the Carleson-Hunt theorem, where the same upper bound on the growth order is obtained for the restricted weak- type norm, and which was the strongest quantitative bound prior to our result. Furthermore, our sparse -norms bound imply new and stronger results at the endpoint . In particular, we obtain that the Fourier series of functions from the weighted Arias de Reyna space , which contains the weighted Antonov space , converge almost everywhere whenever . This is an extension of the results of Antonov and Arias De Reyna, where must be Lebesgue measure. The backbone of our treatment is a new, sharply quantified near- Carleson embedding theorem for the modulation-invariant wave packet transform. The proof of the Carleson embedding relies on a newly developed smooth multi-frequency decomposition which, near the endpoint , outperforms the abstract Hilbert space approach of past works, including the seminal one by Nazarov, Oberlin and Thiele. As a further example of application, we obtain a quantified version of the family of sparse bounds for the bilinear Hilbert transforms due to Culiuc, Ou and the first author.
Cite
@article{arxiv.2204.08051,
title = {The weak-type Carleson theorem via wave packet estimates},
author = {Francesco Di Plinio and Anastasios Fragkos},
journal= {arXiv preprint arXiv:2204.08051},
year = {2022}
}
Comments
38 pages, submitted for publication