David J Chappell
Numerical-asymptotic models for the manipulation of viscous films via dielectrophoresis
Chappell, David J; O'Dea, Reuben D.
Abstract
The effect of an externally applied electric field on the motion of an interface between two viscous dielectric fluids is investigated. We first develop a powerful, efficient and widely applicable boundary integral method to compute the interface dynamics in a general multiphysics model comprising coupled Laplace and Stokes flow problems in a periodic half-space. In particular, we exploit the relevant Stokes and Laplace Green's functions to reduce the problem to one defined on the interfacial part of the domain alone. Secondly, motivated by recent experimental work that seeks to underpin the development of switchable liquid optical devices, we concentrate on a fluid-air interface and derive asymptotic approximations suitable to describe the behaviour of a thin film of fluid above an array of electrodes. In this case, the problem is reduced to a single nonlinear partial differential equation describing the film height, coupled to the electrostatic problem via suitable numerical solution or via an asymptotic formula for electrostatic forcing. Comparison against numerical simulations of the full problem shows that the reduced models succesfully capture key features of the film dynamics in appropriate regimes; all three approaches are shown to reproduce experimental results.
Citation
Chappell, D. J., & O'Dea, R. D. (2020). Numerical-asymptotic models for the manipulation of viscous films via dielectrophoresis. Journal of Fluid Mechanics, 901, Article A35. https://doi.org/10.1017/jfm.2020.545
Journal Article Type | Article |
---|---|
Acceptance Date | Jun 29, 2020 |
Online Publication Date | Sep 2, 2020 |
Publication Date | Oct 25, 2020 |
Deposit Date | Jul 1, 2020 |
Publicly Available Date | Mar 3, 2021 |
Journal | Journal of Fluid Mechanics |
Print ISSN | 0022-1120 |
Electronic ISSN | 1469-7645 |
Publisher | Cambridge University Press |
Peer Reviewed | Peer Reviewed |
Volume | 901 |
Article Number | A35 |
DOI | https://doi.org/10.1017/jfm.2020.545 |
Keywords | Mechanical Engineering; Mechanics of Materials; Condensed Matter Physics |
Public URL | https://nottingham-repository.worktribe.com/output/4743155 |
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