Strichartz estimates and global well-posedness of the cubic NLS on   $\mathbb{T}^{2}$

Sebastian Herr; Beomjong Kwak

arXiv:2309.14275·math.AP·September 11, 2024

Strichartz estimates and global well-posedness of the cubic NLS on $\mathbb{T}^{2}$

Sebastian Herr, Beomjong Kwak

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TL;DR

This paper establishes optimal Strichartz estimates for the Schrödinger equation on the 2D rational torus using incidence geometry, leading to global well-posedness results for the cubic NLS with small data.

Contribution

It introduces a new incidence geometry method to improve Strichartz estimates on the torus, enabling global solutions for the cubic NLS in low regularity spaces.

Findings

01

Proved optimal L^4-Strichartz estimate on or 2

02

Established global well-posedness for cubic NLS with small data in H^s(2) for s>0

03

Developed a novel approach based on incidence geometry

Abstract

The optimal $L^{4}$ -Strichartz estimate for the Schr{\"o}dinger equation on the two-dimensional rational torus $T^{2}$ is proved, which improves an estimate of Bourgain. A new method based on incidence geometry is used. The approach yields a stronger $L^{4}$ bound on a logarithmic time scale, which implies global existence of solutions to the cubic (mass-critical) nonlinear Schr\"odinger equation in $H^{s} (T^{2})$ for any $s > 0$ and data which is small in the critical norm.

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Taxonomy

TopicsAdvanced Mathematical Physics Problems · Numerical methods for differential equations