Strichartz type estimates for solutions to the Schrödinger equation

Pub Date : 2024-04-19 DOI:10.1090/proc/16887

Jie Chen

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引用次数: 0

Abstract

In this article, we show the necessary and sufficient conditions for the inequality ‖ u ‖ L t q L x r ≲ ‖ u ‖ X s , b , \begin{equation*} \|u\|_{L_t^qL_x^r}\lesssim \|u\|_{X^{s,b}}, \end{equation*} where ‖ u ‖ X s , b ≔ ‖ u ^ ( τ , ξ ) ⟨ ξ ⟩ s ⟨ τ + | ξ | 2 ⟩ b ‖ L τ , ξ 2 \|u\|_{X^{s,b}}≔\|\hat {u}(\tau ,\xi )\langle \xi \rangle ^s\langle \tau +|\xi |^2\rangle ^b \|_{L_{\tau ,\xi }^2} . These estimates are also referred to as Strichartz estimates related to Schrödinger equation. We also give a new proof of the maximal function estimates for solutions to Schrödinger and Airy equations.

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薛定谔方程解的斯特里查兹类型估计

在本文中，我们展示了不等式 ‖ u ‖ L t q L x r ≲ ‖ u ‖ X s , b 的必要条件和充分条件。|u\|_{L_t^qL_x^r}\lesssim |u\|_{X^{s,b}}, end{equation*} 其中 ‖ u ‖ X s , b ≔ ‖ u ^ ( τ , ξ ) ξ ⟨ s τ + | ξ | 2 ⟩ b ‖ L τ 、ξ 2 \||u_{X^{s,b}}≔\||hat{u}(\tau ,\xi)（矩形 \xi ）（矩形 \tau + |\xi |^2\rangle ^b \|{L_{tau,\xi}^2}。这些估计也被称为与薛定谔方程有关的斯特里查兹估计。我们还给出了薛定谔方程和艾里方程解的最大函数估计的新证明。

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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