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Zhurnal Vychislitel'noi Matematiki i Matematicheskoi Fiziki, 2011, Volume 51, Number 9, Pages 1645–1664
(Mi zvmmf9541)
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This article is cited in 28 scientific papers (total in 28 papers)
Two-parameter extremum problems of boundary control for stationary thermal convection equations
G. V. Alekseev, D. A. Tereshko Institute of Applied Mathematics, Far East Branch, Russian Academy of Sciences, ul. Radio 7, Vladivostok, 690041 Russia
Abstract:
Two-parameter extremum problems of boundary control are formulated for the stationary thermal convection equations with Dirichlet boundary conditions for velocity and with mixed boundary conditions for temperature. The cost functional is defined as the root mean square integral deviation of the desired velocity (vorticity, or pressure) field from one given in some part of the flow region. Controls are the boundary functions involved in the Dirichlet condition for velocity on the boundary of the flow region and in the Neumann condition for temperature on part of the boundary. The uniqueness of the extremum problems is analyzed, and the stability of solutions with respect to certain perturbations in the cost functional and one of the functional parameters of the original model is estimated. Numerical results for a control problem associated with the minimization of the vorticity norm aimed at drag reduction are discussed.
Key words:
thermal convection, multiparameter extremum problems, uniqueness, stability, coefficient of thermal expansion, stability estimate.
Received: 15.06.2010 Revised: 24.08.2010
Citation:
G. V. Alekseev, D. A. Tereshko, “Two-parameter extremum problems of boundary control for stationary thermal convection equations”, Zh. Vychisl. Mat. Mat. Fiz., 51:9 (2011), 1645–1664; Comput. Math. Math. Phys., 51:9 (2011), 1539–1557
Linking options:
https://www.mathnet.ru/eng/zvmmf9541 https://www.mathnet.ru/eng/zvmmf/v51/i9/p1645
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