Painlev\'e Universality classes for the maximal amplitude solution of the Focusing Nonlinear Schr\"odinger Equation with randomness

Abstract

We establish universality for extremal solutions of the focusing nonlinear Schr\"odinger equation. Extremal solutions are N-soliton solutions that achieve the theoretical maximal amplitude and diverge as N ∞. We consider extremal solutions with the discrete eigenvalues randomly drawn from sub-exponential distributions, and identify two distinct universality classes, determined by the macroscopic structure of the spectrum: the Painlev\'e--III rogue-wave solution, where the eigenvalues take the form λj = vj + i μj, and the Painlev\'e--V rogue wave solution, where λj = -ζ \, j + vj + i μj, with 0 < ζ < 1. (In both cases, μj and vj are subexponential random variables.) Universality can then be summarized as follows: independently of the specific distribution of the eigenvalues, the rescaled solutions converge locally to a deterministic profile governed by the Painlev\'e-III equation in the first regime, and the Painlev\'e-V equation in the second. These results demonstrate that the formation of Painlev\'e-type rogue waves is a universal phenomenon robust to randomness.