Capillary liquid channels in cylindrical support surfaces: stability and bifurcation

TL;DR

This paper analyzes the stability and bifurcation of capillary liquid channels on cylindrical surfaces, identifying conditions for stability, instability, and the emergence of new morphologies through bifurcation analysis.

Contribution

It introduces a stability analysis based on eigenvalues of the Jacobi operator and establishes bifurcation conditions for circular cylinders on support surfaces.

Findings

Critical length for instability of cylindrical segments

Bifurcation conditions for new capillary morphologies

Examples of bifurcation on parabolic and catenary supports

Abstract

Planes and circular cylinders are models of interfaces of a fluid when the support surface is translationally invariant in a direction of the space. After a study of the eigenvalues of the Jacobi operator, it is investigated when planar strips and sections of circular cylinders are stable in cylindrical symmetric support surfaces. This analysis depends on the curvature of the support at the contact points with the interface. The Plateau-Rayleigh instability phenomenon is studied finding the critical value $h_0>0$ such that rectangular pieces of planar strips or circular cylinders of length greater than $h_0$ are necessarily unstable. It is also studied when new morphologies of capillary surfaces can emerge from given circular cylinders. Using the method of bifurcation by simple eigenvalues, we establish conditions on the support surface that prove that when $0$ is a simple eigenvalue of the Jacobi operator, there is bifurcation from explicit circular cylinders. It will be presented examples of supports (parabolic and catenary cylinders) where this bifurcation appears.