Multiple Vector Valued Inequalities via the Helicoidal Method
Abstract
We develop a new method of proving vector-valued estimates in harmonic analysis, which we like to call "the helicoidal method". As a consequence of it, we are able to give affirmative answers to some questions that have been circulating for some time. In particular, we show that the tensor product between the bilinear Hilbert transform and a paraproduct satisfies the same estimates as the itself, solving completely a problem introduced in a paper of Muscalu, Pipher, Tao and Thiele. Then, we prove that for "locally exponents" the corresponding vector valued satisfies (again) the same estimates as the itself. Before the present work there was not even a single example of such exponents. Finally, we prove a bi-parameter Leibniz rule in mixed norm spaces, answering a question of Kenig in nonlinear dispersive PDE.
Keywords
Cite
@article{arxiv.1511.04948,
title = {Multiple Vector Valued Inequalities via the Helicoidal Method},
author = {Cristina Benea and Camil Muscalu},
journal= {arXiv preprint arXiv:1511.04948},
year = {2017}
}
Comments
56 pages, 7 figures