Global well-posedness and scattering for the defocusing septic one-dimensional NLS via new smoothing and almost Morawetz estimates

TL;DR

This paper establishes global well-posedness and scattering for the one-dimensional defocusing septic NLS in low regularity spaces using novel smoothing and almost Morawetz estimates.

Contribution

It introduces new smoothing and almost Morawetz estimates specifically tailored for the low-regularity analysis of the septic NLS.

Findings

Proves global well-posedness for s > 19/54 in H^s(R).

Establishes new smoothing estimates on the nonlinear part of the solution.

Develops almost Morawetz estimates adapted to low-regularity settings.

Abstract

In this paper, we show that the one dimensional septic nonlinear Schr\"odinger equation is globally well-posed and scatters in $H^s (\mathbb{R})$ when $s > 19/54$. We prove new smoothing estimates on the nonlinear Duhamel part of the solution and utilize a linear-nonlinear decomposition to take advantage of the gained regularity. We also prove new $L^{p+3}_{t,x}$ almost Morawetz estimates for the defocusing $p-$NLS adapted to the low-regularity setting, before specializing to the septic case $p=7$.