Searching for missing D'Alembert waves in nonlinear system: Nizhnik-Novikov-Veselov equation

TL;DR

This paper investigates the Nizhnik-Novikov-Veselov equation to rediscover missing D'Alembert wave solutions in nonlinear systems, revealing their relation to soliton molecules and expanding understanding of wave dynamics.

Contribution

The study introduces a method to find D'Alembert wave solutions within a nonlinear (2+1)-dimensional KdV equation, linking soliton molecules to classical wave solutions.

Findings

D'Alembert waves are rediscovered in the NNV equation.

Soliton molecules are closely related to D'Alembert waves.

Interaction solutions among various wave types are analyzed.

Abstract

In linear science, the wave motion equation with general D'Alembert wave solutions is one of the fundamental models. The D'Alembert wave is an arbitrary travelling wave moving along one direction under a fixed model (material) dependent velocity. However, the D'Alembert waves are missed when nonlinear effects are introduced to wave motions. In this paper, we study the possible travelling wave solutions, multiple soliton solutions and soliton molecules for a special (2+1)-dimensional Koteweg-de Vries (KdV) equation, the so-called Nizhnik-Novikov-Veselov (NNV) equation. The missed D'Alembert wave is re-discovered from the NNV equation. By using the velocity resonance mechanism, the soliton molecules are found to be closely related to D'Alembert waves. In fact, the soliton molecules of the NNV equation can be viewed as special D'Alembert waves. The interaction solutions among special D'Alembert type waves ($n$-soliton molecules and soliton-solitoff molecules) and solitons are also discussed.