Universality in the profile of the semiclassical limit solutions to the focusing Nonlinear Schroedinger equation at the first breaking curve

TL;DR

This paper investigates the universal behavior of solutions to the focusing NLS equation in the semiclassical limit, revealing persistent oscillations at the first breaking point with distinct asymptotic scales.

Contribution

It provides a detailed asymptotic analysis of the initial oscillations at the gradient catastrophe, highlighting their nonzero size and two separate natural scales.

Findings

First oscillations have nonzero asymptotic size as epsilon approaches zero.

Oscillations display two natural scales: order epsilon and order epsilon ln(epsilon).

Analysis is based on inverse-scattering and nonlinear steepest descent methods.

Abstract

We consider the semiclassical (zero-dispersion) limit of the one-dimensional focusing Nonlinear Schroedinger equation (NLS) with decaying potentials. If a potential is a simple rapidly oscillating wave (the period has the order of the semiclassical parameter epsilon) with modulated amplitude and phase, the space-time plane subdivides into regions of qualitatively different behavior, with the boundary between them consisting typically of collection of piecewise smooth arcs (breaking curve(s)). In the first region the evolution of the potential is ruled by modulation equations (Whitham equations), but for every value of the space variable x there is a moment of transition (breaking), where the solution develops fast, quasi-periodic behavior, i.e., the amplitude becomes also fastly oscillating at scales of order epsilon. The very first point of such transition is called the point of gradient catastrophe. We study the detailed asymptotic behavior of the left and right edges of the interface between these two regions at any time after the gradient catastrophe. The main finding is that the first oscillations in the amplitude are of nonzero asymptotic size even as epsilon tends to zero, and they display two separate natural scales; of order epsilon in the parallel direction to the breaking curve in the (x,t)-plane, and of order epsilon ln(epsilon) in a transversal direction. The study is based upon the inverse-scattering method and the nonlinear steepest descent method.