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This article is cited in 19 scientific papers (total in 19 papers)
Variational Inequalities for Navier–Stokes Type Operators and One-Sided Problems for Equations of Viscous Heat-Conducting Fluids
A. Yu. Chebotarev Institute of Applied Mathematics, Far-Eastern Branch of the Russian Academy of Sciences
Abstract:
We study a class of stationary variational inequalities for Navier–Stokes type operators that can be used to represent problems with nonlinear boundary conditions for equations of motion of viscous fluids. The main result (the solvability theorem) is used for studying one-sided boundary-value problems for equations of heat convection of viscous fluids.
Received: 02.11.1998
Citation:
A. Yu. Chebotarev, “Variational Inequalities for Navier–Stokes Type Operators and One-Sided Problems for Equations of Viscous Heat-Conducting Fluids”, Mat. Zametki, 70:2 (2001), 296–307; Math. Notes, 70:2 (2001), 264–274
Linking options:
https://www.mathnet.ru/eng/mzm742https://doi.org/10.4213/mzm742 https://www.mathnet.ru/eng/mzm/v70/i2/p296
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