On the pointwise convergence of NLS flow on 2

Abstract

In this paper, we study the almost everywhere convergence of the cubic nonlinear Schr\"odinger flow to the initial data on S2, equation* iut + g u = |u|2u, (t,x)∈× 2. equation* Inspired by the randomization method and the ansatz introduced by Burq, Camps, Sun, and Tzvetkov [Preprint, arXiv:2404.18229], we prove almost sure pointwise convergence almost everywhere for the nonlinear solution at very low regularity. This extends Compaan-Luc\`a-Staffilani [Int. Math. Res. Not. IMRN, (1) (2021), 596--647] to the spherical setting. We also provide a new necessary condition for the associated Lp maximal estimate for the linear Schr\"odinger equation on 2. More precisely, we show that the Lp maximal estimate fails for s<12-12p with p 2. In the special case p=3, our result matches the corresponding range in the 2 case, up to the endpoint, and improves the previous result of Chen-Duong-Lee-Yan [J. Math. Pures Appl. 163 (2022), 433--449].