Analytical solutions for channel flows of Phan-Thien–Tanner and Giesekus fluids under slip

► Analytical and semi-analytical solutions for generalized Newtonian fluids with wall slip. ► The stress models are the Power Law, Bingham, Herschel-Bulkley, Sisko and Robertson-Stiff. ► Four slip models are studied: linear and nonlinear Navier, Hatzikriakos and asymptotic. ► The existence and uniqu...

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Bibliographic Details
Published in:Journal of non-Newtonian fluid mechanics 2012-03, Vol.171-172, p.97-105
Main Authors: Ferrás, Luis L., Nóbrega, João M., Pinho, Fernando T.
Format: Article
Language:English
Subjects:
Analytical solution
Computational fluid dynamics
Fluid flow
Giesekus model
Laws
Mathematical analysis
Mathematical models
Nonlinearity
PTT model
Slip
Viscoelastic fluids
Wall slip
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Summary:► Analytical and semi-analytical solutions for generalized Newtonian fluids with wall slip. ► The stress models are the Power Law, Bingham, Herschel-Bulkley, Sisko and Robertson-Stiff. ► Four slip models are studied: linear and nonlinear Navier, Hatzikriakos and asymptotic. ► The existence and uniqueness of solutions for the nonlinear slip models are proved. Analytical and semi-analytical solutions are presented for the cases of channel and pipe flows with wall slip for viscoelastic fluids described by the simplified PTT (using both the exponential and the linearized kernel) and the Giesekus models. The slip laws used are the linear and nonlinear Navier, the Hatzikiriakos and the asymptotic models. For the nonlinear Navier slip only natural numbers can be used for the exponent of the tangent stress in order to obtain analytical solutions. For other values of the exponent and other nonlinear laws a numerical scheme is required, and thus, the solution is semi-analytical. For these cases the intervals containing the solution and the corresponding proof for the existence and uniqueness are also presented. For the Giesekus model the influence of the wall slip on the restrictions of the slip models is also investigated.
ISSN:0377-0257
1873-2631
DOI:10.1016/j.jnnfm.2012.01.009