H\"ormander type theorem for multilinear Pseudo-differential operators
Abstract
We establish a H\"{o}rmander type theorem for the multilinear pseudo-differential operators, which is also a generalization of the results in \cite{MR4322619} to symbols depending on the spatial variable. Most known results for multilinear pseudo-differential operators were obtained by assuming their symbols satisfy pointwise derivative estimates(Mihlin-type condition), that is, their symbols belong to some symbol classes -, , for some . In this paper, we shall consider multilinear pseudo-differential operators whose symbols have limited smoothness described in terms of function space and not in a pointwise form(H\"ormander type condition). Our conditions for symbols are weaker than the Mihlin-type conditions in two senses: the one is that we only assume the first-order derivative conditions in the spatial variable and lower-order derivative conditions in the frequency variable, and the other is that we make use of -average condition rather than pointwise derivative conditions for the symbols. As an application, we obtain some mapping properties for the multilinear pseudo-differential operators associated with symbols belonging to the classes -, , , . Moreover, it can be pointed out that our results can be applied to wider classes of symbols which do not belong to the traditional symbol classes -.
Cite
@article{arxiv.2207.03735,
title = {H\"ormander type theorem for multilinear Pseudo-differential operators},
author = {Yaryong Heo and Sunggeum Hong and Chan Woo Yang},
journal= {arXiv preprint arXiv:2207.03735},
year = {2023}
}