Modeling of Steady Flows in a Channel by Navier–Stokes Variational Inequalities |
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| Authors: | A. Yu. Chebotarev |
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| Affiliation: | (1) Institute of Applied Mathematics, Far East Division, Russian Academy of Sciences, Vladivostok, 690041 |
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| Abstract: | ![]()
A mathematical model of a steady viscous incompressible fluid flow in a channel with exit conditions different from the Dirichlet conditions is considered. A variational inequality is derived for the formulated subdifferential boundary-value problem, and the structure of the set of its solutions is studied. For two-ption on the low Reynolds number is proved. In the three-dimensional case, a class of constraints on the tangential component of velocity at the exit, which guarantees solvability of the variational inequality, is found. |
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| Keywords: | Navier– Stokes equations boundary conditions steady flows variational inequalities |
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