On smoothing estimates for Schr\"odinger equations on product spaces $\mathbb{T}^m\times \mathbb{R}^n$

TL;DR

This paper establishes sharp smoothing estimates for Schrödinger equations on product spaces combining tori and Euclidean spaces, using decoupling inequalities and analyzing Sobolev and modulation space norms.

Contribution

It introduces new smoothing estimates for Schrödinger operators on product spaces, extending previous results and applying decoupling inequalities to modulation spaces.

Findings

Proves $L^p$ smoothing estimates on $ ^m imes ^n$ for specific $p$ and $ abla$ regularity.

Establishes local $L^p$ smoothing estimates in modulation spaces $M_{p,q}^eta$.

Results are sharp up to endpoint regularity within certain parameter ranges.

Abstract

Let $\Delta_{\mathbb{T}^m\times \mathbb{R}^n}$ denote the Laplace-Beltrami operator on the product spaces $\mathbb{T}^m\times \mathbb{R}^n$. In this article we show that $$ \left\|e^{it\Delta_{\mathbb{T}^m\times \mathbb{R}^n}}f\right\|_{L^p(\mathbb{T}^m\times \mathbb{R}^n\times [0,1])} \leq C \|f\|_{W^{\alpha,p}(\mathbb{T}^m\times\mathbb{R}^n)} $$ holds if $p\geq 2(m+n+2)/(m+n)$ and $\alpha> (m+2n)(1/2-1/p)-2/p$. Furthermore, we apply the $\ell^2$-decoupling inequalities to establish local $L^p$-smoothing estimates for the Schr\"odinger operator $e^{it\Delta_{\mathbb{T}^m\times\mathbb{R}^n}}$ in modulation spaces $M_{p,q}^\alpha(\mathbb{T}^m\times\mathbb{R}^n)$: $$ \|e^{it\Delta_{\mathbb{T}^m\times\mathbb{R}^n}}f\|_{L^p(\mathbb{T}^m\times\mathbb{R}^n\times [0,1])}\leq C \|f\|_{M_{p,q}^\alpha(\mathbb{T}^m\times\mathbb{R}^n)} $$ for some range of $\alpha$ and $p, q$. The smoothing estimates in $L^p$-Sobolev and modulation spaces are sharp up to the endpoint regularity, in a certain range of $p$ and $q$.