Super compact equation for water waves

A. I. Dyachenko; D. I. Kachulin; V. E. Zakharov

arXiv:1511.09331·physics.flu-dyn·June 22, 2016

Super compact equation for water waves

A. I. Dyachenko, D. I. Kachulin, V. E. Zakharov

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TL;DR

This paper derives a highly simplified yet comprehensive equation for gravity water waves that captures nonlinear effects and wave advection, potentially explaining phenomena like wave breaking.

Contribution

The paper introduces a new, super compact equation for water waves that combines nonlinear and advection effects in a simple form.

Findings

01

The derived equation includes nonlinear wave terms similar to NLSE.

02

It accounts for wave advection, possibly leading to wave breaking.

03

The equation simplifies the modeling of gravity water waves.

Abstract

We derive very simple compact equation for gravity water waves which includes nonlinear wave term (`a la NLSE) and advection term (may results in wave breaking).

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