The meandering instability of a viscous thread

TL;DR

This paper investigates the complex oscillatory behaviors of a viscous thread falling onto a moving belt, revealing bifurcations and resonant interactions through precise experiments and amplitude equation modeling.

Contribution

It provides detailed experimental measurements of meandering and coiling states and introduces a theoretical framework using amplitude equations for resonant mode interactions.

Findings

Identification of bifurcation from steady catenary to meandering state

Observation of two-frequency 'figure eight' oscillations

Reversion to single-frequency coiling at low belt speeds

Abstract

A viscous thread falling from a nozzle onto a surface exhibits the famous rope-coiling effect, in which the thread buckles to form loops. If the surface is replaced by a belt moving with speed $U$, the rotational symmetry of the buckling instability is broken and a wealth of interesting states are observed [See S. Chiu-Webster and J. R. Lister, J. Fluid Mech., {\bf 569}, 89 (2006)]. We experimentally studied this "fluid mechanical sewing machine" in a new, more precise apparatus. As $U$ is reduced, the steady catenary thread bifurcates into a meandering state in which the thread displacements are only transverse to the motion of the belt. We measured the amplitude and frequency $\omega$ of the meandering close to the bifurcation. For smaller $U$, single-frequency meandering bifurcates to a two-frequency "figure eight" state, which contains a significant $2\omega$ component and parallel as well as transverse displacements. This eventually reverts to single-frequency coiling at still smaller $U$. More complex, highly hysteretic states with additional frequencies are observed for larger nozzle heights. We propose to understand this zoology in terms of the generic amplitude equations appropriate for resonant interactions between two oscillatory modes with frequencies $\omega$ and $2\omega$. The form of the amplitude equations captures both the axisymmetry of the U=0 coiling state and the symmetry-breaking effects induced by the moving belt.