Stagnation‐point flow of the Walters′ B′ fluid with slip

Labropulu, F.; Husain, Iqbal; Chinichian, M.

doi:10.1155/s0161171204406528

Cited by 16 publications

(8 citation statements)

References 15 publications

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“…7,8) Such exact solutions can be used, and have indeed been used in the past, to calibrate computer codes. However, one should always bear in mind that a computer code which behaves decently in simple geometries such as Poiseuille flow may fail rather miserably in complex geometries such as Jeffrey-Hamel flow.…”

Section: Introductionmentioning

confidence: 99%

On the Role Played by the Extensional Behavior of Giesekus Fluids in Plane Stagnation Flow

Mirzadeh

Sadeghy

2009

J. Soc. Rheol., Jpn

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An exact solution has been found in plane stagnation flow for a viscoelastic fluid obeying the Giesekus model. The flow was found to render itself to a local similarity solution in the vicinity of the stagnation point. The solution so obtained could easily enable one to investigate the effects of parameters such as Reynolds number, Weissenberg number and the mobility factor on the velocity and stress fields. Unlike Newtonian and Maxwellian fluids, the thickness of the boundary layer was found to be a decreasing function of the distance from the stagnation point. It will be shown that this effect may have roots in the extensional behavior of the fluid.

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Section: Introductionmentioning

confidence: 99%

On the Role Played by the Extensional Behavior of Giesekus Fluids in Plane Stagnation Flow

Mirzadeh

Sadeghy

2009

J. Soc. Rheol., Jpn

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“…Wang [10] perceived the flow due to a stretching boundary with partial slip and further extended the work for stagnation point flows with slip [11]. Labropulu et al [12] condu Q2 cted a study on stagnation Point flow of the Walters' B′ fluid with slip. Anderson [13] inspected the MHD flow of a viscoelastic fluid past a stretching surface.…”

Section: Q2mentioning

confidence: 99%

Combined effects of magnetic field and partial slip on obliquely striking rheological fluid over a stretching surface

Nadeem

Mehmood

Akbar

2015

Journal of Magnetism and Magnetic Materials

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“…are the dimensionless measures of the viscoelasticity of the fluid and the velocity slip, respectively. In their work Labropulu et al [14] ignored the k-term in their boundary condition corresponding to (7b), i.e., they took the same boundary condition which is applicable for the Newtonian fluids. Their results are therefore not valid.…”

Section: Equations Of Motionmentioning

confidence: 99%

“…He obtained a numerical solution for various values of the dimensionless slip parameter λ. For the corresponding problem for an elastico-viscous fluid, an effort to extract the influence of the elasticity of the fluid on the flow has been made by Labropulu et al [14]. Unfortunately, their study suffers from two serious drawbacks.…”

Section: Introductionmentioning

confidence: 99%

Two dimensional stagnation point flow of an elastico‐viscous fluid with partial slip

Ariel

2008

Z Angew Math Mech

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The steady, laminar flow of an elastico-viscous fluid impinging normally upon a wall has been investigated when there is a partial slip of the fluid at the wall. The governing equations of motion admit a similarity solution in terms of η, the dimensionless distance normal to the wall. The boundary value problem characterizing the flow has been solved without making any assumption on the size of either the viscoelastic fluid parameter or the partial slip parameter. The solutions are shown to exist only up to a critical value of viscoelastic fluid parameter. The effect of the partial slip is to enhance this critical value.

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Stagnation‐point flow of the Walters′ B′ fluid with slip

Abstract: The steady two-dimensional stagnation point flow of a non-Newtonian Walters' B' fluid with slip is studied. The fluid impinges on the wall either orthogonally or obliquely. A finite difference technique is employed to obtain solutions

Cited by 16 publications

References 15 publications

On the Role Played by the Extensional Behavior of Giesekus Fluids in Plane Stagnation Flow

On the Role Played by the Extensional Behavior of Giesekus Fluids in Plane Stagnation Flow

Combined effects of magnetic field and partial slip on obliquely striking rheological fluid over a stretching surface

Two dimensional stagnation point flow of an elastico‐viscous fluid with partial slip

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