Alternating hexagonal and striped patterns in Faraday surface waves

Nicolas Perinet; Damir Juric; Laurette S. Tuckerman

arXiv:1205.0507·nlin.PS·March 20, 2015

Alternating hexagonal and striped patterns in Faraday surface waves

Nicolas Perinet, Damir Juric, Laurette S. Tuckerman

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TL;DR

This paper presents numerical simulations of Faraday surface waves revealing the spontaneous alternation between hexagonal and striped patterns, with analysis of their symmetries and spectral properties.

Contribution

It introduces the observation of pattern alternation in Faraday waves and analyzes their symmetry and spectral characteristics.

Findings

01

Patterns alternate between quasi-hexagons and beaded stripes over time.

02

Symmetries and Fourier spectra of the patterns are characterized.

03

The study provides insights into pattern dynamics in Faraday wave systems.

Abstract

A direct numerical simulation of Faraday waves is carried out in a minimal hexagonal domain. Over long times, we observe the alternation of patterns we call quasi-hexagons and beaded stripes. The symmetries and spatial Fourier spectra of these patterns are analyzed.

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