Pinning, de-pinning and re-pinning of a slowly varying rivulet

Paterson, Colin and Wilson, Stephen and Duffy, Brian (2013) Pinning, de-pinning and re-pinning of a slowly varying rivulet. European Journal of Mechanics - B/Fluids, 41 (septem). pp. 94-108. ISSN 0997-7546 (https://doi.org/10.1016/j.euromechflu.2013.02.006)

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Abstract

The solutions for the unidirectional flow of a thin rivulet with prescribed volume flux down an inclined planar substrate are used to describe the locally unidirectional flow of a rivulet with constant width (i.e. pinned contact lines) but slowly varying contact angle as well as the possible pinning and subsequent de-pinning of a rivulet with constant contact angle and the possible depinning and subsequent re-pinning of a rivulet with constant width as they flow in the azimuthal direction from the top to the bottom of a large horizontal cylinder. Despite being the same locally, the global behaviour of a rivulet with constant width can be very different from that of a rivulet with constant contact angle. In particular, while a rivulet with constant non-zero contact angle can always run from the top to the bottom of the cylinder, the behaviour of a rivulet with constant width depends on the value of the width. Specifically, while a narrow rivulet can run all the way from the top to the bottom of the cylinder, a wide rivulet can run from the top of the cylinder only to a critical azimuthal angle. The scenario in which the hitherto pinned contact lines of the rivulet de-pin at the critical azimuthal angle and the rivulet runs from the critical azimuthal angle to the bottom of the cylinder with zero contact angle but slowly varying width is discussed. The pinning and de-pinning of a rivulet with constant contact angle, and the corresponding situation involving the de-pinning and re-pinning of a rivulet with constant width at a non-zero contact angle which generalises the de-pinning at zero contact angle discussed earlier, are described. In the latter situation, the mass of fluid on the cylinder is found to be a monotonically increasing function of the constant width.

ORCID iDs

Paterson, Colin, Wilson, Stephen ORCID logoORCID: https://orcid.org/0000-0001-7841-9643 and Duffy, Brian ORCID logoORCID: https://orcid.org/0000-0003-2687-7938;
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