Discontinuous liquid rise in capillaries with varying cross-sections

Research output: Contribution to journalArticlepeer-review

50 Scopus citations

Abstract

We consider theoretically liquid rise against gravity in capillaries with height-dependent cross-sections. For a conical capillary made from a hydrophobic surface and dipped in a liquid reservoir, the equilibrium liquid height depends on the cone-opening angle α, the Young-Dupré contact angle θ, the cone radius at the reservoir's level R0, and the capillary length κ-1. As a is increased from zero, the meniscus' position changes continuously until, when a attains a critical value, the meniscus jumps to the bottom of the capillary. For hydrophilic surfaces the meniscus jumps to the top. The same liquid height discontinuity can be achieved with electrowetting with no mechanical motion. Essentially the same behavior is found for two tilted surfaces. We further consider capillaries with periodic radius modulations and find that there are few competing minima for the meniscus location. A transition from one to another can be performed by the use of electrowetting. Finite pressure difference between the two sides of the liquids can be incorporated as well, resulting in complicated phase-diagrams in the α-θ plane. The phenomenon discussed here may find uses in microfluidic applications requiring the transport small amounts of water "quanta" (volume < 1 nL) in a regular fashion.

Original languageEnglish
Pages (from-to)8860-8863
Number of pages4
JournalLangmuir
Volume22
Issue number21
DOIs
StatePublished - 10 Oct 2006

Fingerprint

Dive into the research topics of 'Discontinuous liquid rise in capillaries with varying cross-sections'. Together they form a unique fingerprint.

Cite this