The Polynomial Carleson Operator
Abstract
We prove affirmatively the one dimensional case of a conjecture of Stein regarding the -boundedness of the Polynomial Carleson operator, for . The proof is based on two new ideas: i) developing a framework for \emph{higher-order wave-packet analysis} that is consistent with the time-frequency analysis of the (generalized) Carleson operator, and ii) a new tile discretization of the time-frequency plane that has the major consequence of \emph{eliminating the exceptional sets} from the analysis of the Carleson operator. As a further consequence, we are able to provide the full boundedness range and prove directly -- without interpolation techniques -- the strong bound for the (generalized) Carleson operator, answering a question raised by C. Fefferman.
Cite
@article{arxiv.1105.4504,
title = {The Polynomial Carleson Operator},
author = {Victor Lie},
journal= {arXiv preprint arXiv:1105.4504},
year = {2019}
}
Comments
Submitted, 82 pages, no figures. This is a revised and improved version of the paper "On Stein's Conjecture on the Polynomial Carleson Operator" (arXiv:0805.1580v1); in particular, we have extended the results of that paper to the full range of expected $L^p$ spaces