Square function and heat flow estimates on domains
Analysis of PDEs
2016-10-05 v2
Abstract
The first purpose of this note is to provide a proof of the usual square function estimate on Lp (?). It turns out to follow directly from a generic Mikhlin multiplier theorem obtained by Alexopoulos, which mostly relies on Gaussian bounds on the heat kernel. We also provide a simple proof of a weaker version of the square function estimate, which is enough in most instances involving dispersive PDEs. Moreover, we obtain, by a relatively simple integration by parts, several useful Lp (?; H) bounds for the derivatives of the heat ?ow with values in a given Hilbert space H.
Keywords
Cite
@article{arxiv.0812.2733,
title = {Square function and heat flow estimates on domains},
author = {Oana Ivanovici and Fabrice Planchon},
journal= {arXiv preprint arXiv:0812.2733},
year = {2016}
}