On uniqueness of KP soliton structures

TL;DR

This paper characterizes and proves the uniqueness of KP soliton solutions, including multi-solitons and degenerate solutions, using nonlinear differential equations and functionals tailored to the soliton structure.

Contribution

It introduces a set of functional equations based on phase and profile variables that uniquely identify KP solitons and extends these results to related 2D dispersive models.

Findings

Uniqueness of line-solitons and multi-solitons established.

Functional equations depend solely on phase and profile variables.

Results applicable to Zakharov-Kuznetsov equations.

Abstract

We consider the Kadomtsev-Petviashvili II (KP) model placed in $\mathbb R_t \times \mathbb R_{x,y}^2$, in the case of smooth data that are not necessarily in a Sobolev space. In this paper, the subclass of smooth solutions we study is of ``soliton type'', characterized by a phase $\Theta=\Theta(t,x,y)$ and a unidimensional profile $F$. In particular, every classical KP soliton and multi-soliton falls into this category with suitable $\Theta$ and $F$. We establish concrete characterizations of KP solitons by means of a natural set of nonlinear differential equations and inclusions of functionals of Wronskian, Airy and Heat types, among others. These functional equations only depend on the new variables $\Theta$ and $F$. A distinct characteristic of this set of functionals is its special and rigid structure tailored to the considered soliton. By analyzing $\Theta$ and $F$, we establish the uniqueness of line-solitons, multi-solitons, and other degenerate solutions among a large class of KP solutions. Our results are also valid for other 2D dispersive models such as the quadratic and cubic Zakharov-Kuznetsov equations.