Research output: Contribution to journal › Article › peer-review
Stationary magnetohydrodynamical flows of non-isothermal polymeric liquid in the flat channel. / Blokhin, A. M.; Semenko, R. E.
In: Вестник ЮУрГУ. Серия "Математическое моделирование и программирование", Vol. 11, No. 4, 01.11.2018, p. 41-54.Research output: Contribution to journal › Article › peer-review
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TY - JOUR
T1 - Stationary magnetohydrodynamical flows of non-isothermal polymeric liquid in the flat channel
AU - Blokhin, A. M.
AU - Semenko, R. E.
PY - 2018/11/1
Y1 - 2018/11/1
N2 - This paper studies the problem of the magnetohydrodynamical flow of incompressible conductive polymeric liquid inside the flat channel in the magnetic field. There is an electric current flowing on the walls of the channel. The walls themselves have different constant temperature. The magnetohydrodynamical model we use in the paper is based on the modified rheological Pokrovskii-Vinogradov model with additional Maxwell equations. We obtain the boundary value problem for this model and look for specific steady-state solutions which are alike the well-known viscous flows of Poiseuille and Couette. The problem for such solutions is reduced to a boundary value problem for a system of nonlinear ordinary differential equations, which in turn is transformed to the system of integral equation. We solve this system by fixed-point iterations. We examine the solutions for various values of parameters and study the influence of these parameters at the flow regime. The results of the paper show that is possible to control the flow of liquid polymer in a flat channel using an external magnetic field and non-inform heating.
AB - This paper studies the problem of the magnetohydrodynamical flow of incompressible conductive polymeric liquid inside the flat channel in the magnetic field. There is an electric current flowing on the walls of the channel. The walls themselves have different constant temperature. The magnetohydrodynamical model we use in the paper is based on the modified rheological Pokrovskii-Vinogradov model with additional Maxwell equations. We obtain the boundary value problem for this model and look for specific steady-state solutions which are alike the well-known viscous flows of Poiseuille and Couette. The problem for such solutions is reduced to a boundary value problem for a system of nonlinear ordinary differential equations, which in turn is transformed to the system of integral equation. We solve this system by fixed-point iterations. We examine the solutions for various values of parameters and study the influence of these parameters at the flow regime. The results of the paper show that is possible to control the flow of liquid polymer in a flat channel using an external magnetic field and non-inform heating.
KW - Magnetohydrodynamics
KW - Polymeric liquid
KW - Stationary solution
KW - Viscoelasticity
KW - CONSTITUTIVE-EQUATIONS
KW - magnetohydrodynamics
KW - viscoelasticity
KW - MHD
KW - stationary solution
KW - polymeric liquid
KW - NANOFLUID
UR - http://www.scopus.com/inward/record.url?scp=85057628145&partnerID=8YFLogxK
U2 - 10.14529/mmpl80403
DO - 10.14529/mmpl80403
M3 - Article
AN - SCOPUS:85057628145
VL - 11
SP - 41
EP - 54
JO - Вестник ЮУрГУ. Серия "Математическое моделирование и программирование"
JF - Вестник ЮУрГУ. Серия "Математическое моделирование и программирование"
SN - 2071-0216
IS - 4
ER -
ID: 17687112