# Existence, nonexistence, and asymptotics of deep water solitary waves   with localized vorticity

**Authors:** Robin Ming Chen, Samuel Walsh, Miles H. Wheeler

arXiv: 1706.00147 · 2021-07-30

## TL;DR

This paper investigates the existence, nonexistence, and asymptotic behavior of deep water solitary waves with localized vorticity, providing new insights into wave properties and establishing conditions for wave existence.

## Contribution

It introduces new results on the asymptotics of solitary waves with localized vorticity and proves the existence of capillary-gravity waves under specific conditions.

## Key findings

- Ruling out waves with single sign free surface elevations.
- Proving existence of waves with localized vorticity.
- Linking asymptotics at infinity to net vorticity.

## Abstract

In this paper, we study solitary waves propagating along the surface of an infinitely deep body of water in two or three dimensions. The waves are acted upon by gravity and capillary effects are allowed --- but not required --- on the interface. We assume that the vorticity is localized in the sense that it satisfies certain moment conditions, and we permit there to be finitely many point vortices in the bulk of the fluid in two dimensions. We also consider a two-fluid model with a vortex sheet.   Under mild decay assumptions, we obtain precise asymptotics for the velocity field and free surface, and relate this to global properties of the wave. For instance, we rule out the existence of waves whose free surface elevations have a single sign and of vortex sheets with finite angular momentum. Building on the work of Shatah, Walsh, and Zeng, we also prove the existence of families of two-dimensional capillary-gravity waves with compactly supported vorticity satisfying the above assumptions. For these waves, we further show that the free surface is positive in a neighborhood of infinity, and that the asymptotics at infinity are linked to the net vorticity.

## Full text

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## References

35 references — full list in the complete paper: https://tomesphere.com/paper/1706.00147/full.md

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Source: https://tomesphere.com/paper/1706.00147