Strichartz estimates with loss of derivatives under a weak dispersion property for the wave operator

Q4 Mathematics

Confluentes Mathematici Pub Date : 2016-05-04 DOI:10.5802/cml.56

V. Samoyeau

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引用次数: 0

Abstract

This paper can be considered as a sequel of [BS14] by Bernicot and Samoyeau, where the authors have proposed a general way of deriving Strichartz estimates for the Schr{\"o}dinger equation from a dispersive property of the wave propagator. It goes through a reduction of H 1 -- BMO dispersive estimates for the Schr{\"o}dinger propagator to L 2 -- L 2 microlocalized (in space and in frequency) dispersion inequalities for the wave operator. This paper aims to contribute in enlightening our comprehension of how dispersion for waves imply dispersion for the Schr{\"o}dinger equation. More precisely, the hypothesis of our main theorem encodes dispersion for the wave equation in an uniform way, with respect to the light cone. In many situations the phenomena that arise near the boundary of the light cone are the more complicated ones. The method we present allows to forget those phenomena we do not understand very well yet. The second main step shows the Strichartz estimates with loss of derivatives we can obtain under those assumptions. The setting we work with is general enough to recover a large variety of frameworks (infinite metric spaces, Riemannian manifolds with rough metric, some groups, ...) where the lack of knowledge of the wave propagator is a restraint to our understanding of the dispersion phenomenon.

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波算符在弱色散性质下带导数损失的Strichartz估计

本文可以看作是Bernicot和Samoyeau [BS14]的续篇，他们提出了一种从波传播子的色散性质推导Schr{\ o}dinger方程的Strichartz估计的一般方法。它通过将薛定谔传播子的h1—BMO色散估计简化为波算符的l2—l2微局域(在空间和频率上)色散不等式。本文旨在启发我们对波的色散如何意味着薛定谔方程的色散的理解。更准确地说，我们主要定理的假设以一种均匀的方式编码波动方程的色散，相对于光锥。在许多情况下，在光锥边界附近出现的现象更为复杂。我们提出的方法可以让我们忘记那些我们还不太了解的现象。第二步主要展示了在这些假设下我们可以得到的带有导数损失的Strichartz估计。我们使用的设置足够普遍，可以恢复各种各样的框架(无限度量空间，粗糙度量的黎曼流形，一些群，……)，其中缺乏对波传播子的了解是我们对色散现象的理解的限制。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Confluentes Mathematici Mathematics-Mathematics (miscellaneous)

CiteScore

0.60

自引率

0.00%

发文量

期刊介绍： Confluentes Mathematici is a mathematical research journal. Since its creation in 2009 by the Institut Camille Jordan UMR 5208 and the Unité de Mathématiques Pures et Appliquées UMR 5669 of the Université de Lyon, it reflects the wish of the mathematical community of Lyon—Saint-Étienne to participate in the new forms of scientific edittion. The journal is electronic only, fully open acces and without author charges. The journal aims to publish high quality mathematical research articles in English, French or German. All domains of Mathematics (pure and applied) and Mathematical Physics will be considered, as well as the History of Mathematics. Confluentes Mathematici also publishes survey articles. Authors are asked to pay particular attention to the expository style of their article, in order to be understood by all the communities concerned.