Bounds on the growth of high Sobolev norms of solutions to Nonlinear Schrodinger Equations on $\mathbb{R}$

TL;DR

This paper establishes bounds on the growth of high Sobolev norms for solutions to the cubic nonlinear Schrödinger and Hartree equations on the real line, using frequency decomposition and improved Strichartz estimates.

Contribution

It provides new bounds on Sobolev norm growth for these equations on $\

Findings

Uniform bounds on integral Sobolev norms for cubic NLS

Improved bounds on Sobolev norms for Hartree equation

Application of frequency decomposition and Strichartz estimates

Abstract

In this paper, we consider the cubic nonlinear Schrodinger equation, and the Hartree equation, with sufficiently regular convolution potential, both on the real line. We are interested in bounding the growth of high Sobolev norms of solutions to these equations. Since the cubic NLS is completely integrable, it makes sense to bound only the fractional Sobolev norms of solutions, whose initial data is of restricted smoothness. For the Hartree equation, we consider all Sobolev norms. For both equations, we derive our results by using an appropriate frequency decomposition. In the case of the cubic NLS, this method allows us to recover uniform bounds on the integral Sobolev norms, up to a factor of $t^{0+}$. For the Hartree equation, we use the same method as in our previous work on $S^1$, and the improved Strichartz estimate to obtain a better bound than we previously obtained in the periodic setting.