Details

Title

Squeeze flow modeling with the use of micropolar fluid theory

Journal title

Bulletin of the Polish Academy of Sciences: Technical Sciences

Yearbook

2017

Numer

No 6

Publication authors

Divisions of PAS

Nauki Techniczne

Publisher

Polish Academy of Sciences

Date

2017

Identifier

ISSN 0239-7528, eISSN 2300-1917

References

Kucaba (2004), Modelling by Use Micropolar Fluid Theory OW in Polish, null, 15. ; Łukaszewicz (1999), Fluids Theory Application, null, 19. ; Kucaba (2001), Effects of non - zero values of microrotation vector on the walls on squeeze film behaviour of micropolar fluid, Intern Sci, 24, 115. ; Prokhorenko (1999), Stadthaus Theoretical Principles of Liquid Penetrant Testing Verlag, null, 25. ; Prakash (1976), Cyclic squeeze films in micropolar fluid lubricated bearing, journal, 412. ; Markensteijn (2012), comparison of the value of viscosity for several water models using Poiseuillea flow in a channel, nano Chem Phys, 28, 136. ; Hamrock (1994), Fundamental of Fluid Film New York, Lubrication. ; Sharma (null), Ram Influence of micropolar lubricants on asymmetric slot - entry bearing, journal Online, 11, 320. ; Rapaport (1994), - induced order and rotation in pipe flow of short - chain molecules, Europhysics Letters, 13, 401. ; Sharma (null), Ram Compensated hole - entry hybrid journal bearing by CFV restrictor under micropolar lubricants Proceedings of Malaysian International Tribology Conference, null, 12, 171. ; Kline (1970), flows of fluids with microstructure of, Physics Fluids, 22, 263. ; Kolpashchikov (1983), Experimental determination of material micropolar fluid constants, Int J Engng Sci, 26, 405. ; Kucaba (2009), MD Computer simulation of water flows in nanochannels Pol, Tech, 17, 1. ; Kucaba (2014), modelling inNanomechanics Selected Problems eds, null, 27, 51. ; Asadi (2012), Homotopy analysis of transient magneto - bio - fluid dynamics of micropolar squeeze film in a porous medium : a model for magneto - biorheological lubrication of in and, Journal Mechanics Medicine Biology, 12, 1. ; Eringen (1966), Theory of micropolar fluids, Math Mech, 16, 1. ; Hansen (2011), Rotational and spin viscosities of water Application to nanofluidics, Phys Review, 18. ; Prakash (1976), Squeeze film theory for micropolar fluids, Lubr Technol, 1. ; Kucaba (2004), flow modelling with the micropolar fluid theory Pol, Tech, 16, 209. ; Badur (null), On the angular velocity slip in flows, nano Microfluid Nanofluid, 20, 191, doi.org/10.1007/s1040401515646 ; Shimpi (2012), Magnetic fluidbased squeeze film performance in rotating curved porous circular plates : the effect of deformation and surface roughness Tribology in Industry, null, 34, 57. ; Hays (1963), Squeeze films for rectangular plates Fluids, Eng, 85. ; Wang (2006), Numerical analysis of journal bearings lubricated with micropolar fluids including thermal and cavitating effects, Tribol Int, 39, 227. ; Delhommelle (2002), flow of micropolar fluid, Molecular Physics, 14, 2857. ; Ghanabi (null), Study of squeeze film damping in a micro - beam resonator based on micro - polar theory http dx org, null, 21, 2015, doi.org/10.1590/167978251364 ; Willson (1969), Basic flows of micropolar liquid, Appl Sci Res, 23, 338.

DOI

10.1515/bpasts-2017-0100

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