A sparse quadratic $T1$ theorem
Classical Analysis and ODEs
2020-11-03 v1
Abstract
We show that any Littlewood--Paley square function satisfying a minimal local testing condition is dominated by a sparse form, \begin{equation*} \langle (Sf)^2,g \rangle\le C \sum_{I \in \mathscr{S}} \langle \lvert f\rvert\rangle_I^2 \langle \lvert g\rvert\rangle_I \lvert I\rvert . \end{equation*} This implies strong weighted estimates for all weights with sharp dependence on the characteristic. The proof uses random dyadic grids, decomposition in the Haar basis, and a stopping time argument.
Cite
@article{arxiv.2004.05365,
title = {A sparse quadratic $T1$ theorem},
author = {Gianmarco Brocchi},
journal= {arXiv preprint arXiv:2004.05365},
year = {2020}
}
Comments
28 pages, 1 figure