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- Q5701708 subject Q7138878.
- Q5701708 abstract "Hele-Shaw flow (named after Henry Selby Hele-Shaw) is defined as Stokes flow between two parallel flat plates separated by an infinitesimally small gap. Various problems in fluid mechanics can be approximated to Hele-Shaw flows and thus the research of these flows is of importance. Approximation to Hele-Shaw flow is specifically important to micro-flows. This is due to manufacturing techniques, which creates shallow planar configurations, and the typically low Reynolds numbers of micro-flows.The governing equation of Hele-Shaw flows is identical to that of the inviscid potential flow and to the flow of fluid through a porous medium (Darcy's law). It thus permits visualization of this kind of flow in two dimensions.".
- Q5701708 thumbnail Hele_Shaw_Geometry.jpg?width=300.
- Q5701708 wikiPageExternalLink sSeries.asp?code=CML&srt=T.
- Q5701708 wikiPageWikiLink Q1224521.
- Q5701708 wikiPageWikiLink Q1543991.
- Q5701708 wikiPageWikiLink Q1607253.
- Q5701708 wikiPageWikiLink Q178932.
- Q5701708 wikiPageWikiLink Q2858941.
- Q5701708 wikiPageWikiLink Q392416.
- Q5701708 wikiPageWikiLink Q5701706.
- Q5701708 wikiPageWikiLink Q6456556.
- Q5701708 wikiPageWikiLink Q674202.
- Q5701708 wikiPageWikiLink Q7138878.
- Q5701708 wikiPageWikiLink Q96647.
- Q5701708 comment "Hele-Shaw flow (named after Henry Selby Hele-Shaw) is defined as Stokes flow between two parallel flat plates separated by an infinitesimally small gap. Various problems in fluid mechanics can be approximated to Hele-Shaw flows and thus the research of these flows is of importance. Approximation to Hele-Shaw flow is specifically important to micro-flows.".
- Q5701708 label "Hele-Shaw flow".
- Q5701708 depiction Hele_Shaw_Geometry.jpg.