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| Predicate | Object |
|---|---|
| rdf:type | |
| lifeskim:mentions | |
| pubmed:issue |
6
|
| pubmed:dateCreated |
1967-9-12
|
| pubmed:abstractText |
Starting with the Navier-Stokes equations, a system of equations is obtained to describe quasi-one-dimensional behavior of fluid in a compliant tube. The nonlinear terms which cannot be shown to be small in the original equations are retained, and the resulting equations are nonlinear. A functional pressure-area relationship is postulated and the final set of equations are quasi-linear and hyperbolic, with two independent and two dependent variables. A method of numerical solution of the set of equations is indicated, and the application to cases of interest is discussed.
|
| pubmed:commentsCorrections | |
| pubmed:language |
eng
|
| pubmed:journal | |
| pubmed:citationSubset |
IM
|
| pubmed:status |
MEDLINE
|
| pubmed:month |
Nov
|
| pubmed:issn |
0006-3495
|
| pubmed:author | |
| pubmed:issnType |
Print
|
| pubmed:volume |
6
|
| pubmed:owner |
NLM
|
| pubmed:authorsComplete |
Y
|
| pubmed:pagination |
717-24
|
| pubmed:dateRevised |
2009-11-18
|
| pubmed:meshHeading |
pubmed-meshheading:5972373-Biophysical Phenomena,
pubmed-meshheading:5972373-Biophysics,
pubmed-meshheading:5972373-Blood Circulation,
pubmed-meshheading:5972373-Blood Flow Velocity,
pubmed-meshheading:5972373-Mathematics,
pubmed-meshheading:5972373-Models, Theoretical,
pubmed-meshheading:5972373-Rheology
|
| pubmed:year |
1966
|
| pubmed:articleTitle |
A theory of fluid flow in compliant tubes.
|
| pubmed:publicationType |
Journal Article
|