Quasimode and Strichartz estimates for time-dependent Schrödinger equations with singular potentials

IF 0.6 3区 数学 Q3 MATHEMATICS
Xiaoqi Huang, C. Sogge
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引用次数: 6

Abstract

We generalize the Strichartz estimates for Schrodinger operators on compact manifolds of Burq, Gerard and Tzvetkov [10] by allowing critically singular potentials $V$. Specifically, we show that their $1/p$--loss $L^p_tL^q_x(I\times M)$-Strichartz estimates hold for $e^{-itH_V}$ when $H_V=-\Delta_g+V(x)$ with $V\in L^{n/2}(M)$ if $n\ge3$ or $V\in L^{1+\delta}(M)$, $\delta>0$, if $n=2$, with $(p,q)$ being as in the Keel-Tao theorem and $I\subset {\mathbb R}$ a bounded interval. We do this by formulating and proving new "quasimode" estimates for scaled dyadic unperturbed Schrodinger operators and taking advantage of the the fact that $1/q'-1/q=2/n$ for the endpoint Strichartz estimates when $(p,q)=(2,2n/(n-2))$. We also show that the universal quasimode estimates that we obtain are saturated on {\em any} compact manifolds; however, we suggest that they may lend themselves to improved Strichartz estimates in certain geometries using recently developed "Kakeya-Nikodym" techniques developed to obtain improved eigenfunction estimates assuming, say, negative curvatures.
奇异势含时Schrödinger方程的Quasimode和Strichartz估计
通过允许临界奇异势$V$,我们推广了Burq、Gerard和Tzvetkov[10]紧流形上薛定谔算子的Strichartz估计。特别地,我们证明了当$H_V=-\Delta_g+V(x)$时,当L^{n/2}(M)$中的$V\为$n\ge3$时,他们的$1/p$——损失$L^p_tL^q_x(I\乘以M)$-Strichartz估计对$e^{-itH_V}$成立,如果L^(1+\Delta)(M)中的$n\ge3$或$V\,如果$n=2$,$\Delta>0$,其中$(p,q)$与Keel-Tao定理中的一样,并且$I\subet{\mathbb R}$是有界的间隔。我们通过公式化和证明标度并矢无扰动薛定谔算子的新的“准模”估计,并利用当$(p,q)=(2,2n/(n-2))$时,Strichartz端点估计的$1/q'-1/q=2/n$这一事实来做到这一点。我们还证明了我们得到的泛拟模估计在{em-any}紧流形上是饱和的;然而,我们认为,它们可能有助于使用最近开发的“Kakeya-Nikodym”技术在某些几何结构中改进Strichartz估计,该技术是为了在假设负曲率的情况下获得改进的本征函数估计而开发的。
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
CiteScore
1.40
自引率
0.00%
发文量
9
审稿时长
6.0 months
期刊介绍: Dedicated to publication of complete and important papers of original research in all areas of mathematics. Expository papers and research announcements of exceptional interest are also occasionally published. High standards are applied in evaluating submissions; the entire editorial board must approve the acceptance of any paper.
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