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February 2009 Optimal Control Problems for the Two Dimensional Rayleigh--Bénard Type Convection by a Gradient Method
Hyung-Chun Lee
Japan J. Indust. Appl. Math. 26(1): 93-121 (February 2009).

Abstract

In this aricle, the author considers mathematical formulation and numerical solutions of distributed and Neumann boundary optimal control problems associated with the stationary Bénard problem. The solution of the optimal control problem is obtained by controlling of the source term of the equations and/or Neumann boundary conditions. Then the author considers the approximation, by finite element methods, of the optimality system and derive optimal error estimates. The convergence of a simple gradient method is proved and some numerical results are given.

Citation

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Hyung-Chun Lee. "Optimal Control Problems for the Two Dimensional Rayleigh--Bénard Type Convection by a Gradient Method." Japan J. Indust. Appl. Math. 26 (1) 93 - 121, February 2009.

Information

Published: February 2009
First available in Project Euclid: 5 June 2009

zbMATH: 1166.49004
MathSciNet: MR2518630

Keywords: Boussinesq equations , flow control , optimization , temperature control

Rights: Copyright © 2009 The Japan Society for Industrial and Applied Mathematics

Vol.26 • No. 1 • February 2009
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