A variational technique for optimal boundary control in a hyperbolic problem

A variational technique for optimal boundary control in a hyperbolic problem

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Article ID: iaor20121892
Volume: 218
Issue: 12
Start Page Number: 6629
End Page Number: 6636
Publication Date: Feb 2012
Journal: Applied Mathematics and Computation
Authors: , ,
Keywords: control, differential equations
Abstract:

We investigate the problem of controlling the boundary functions in a one dimensional hyperbolic problem by minimizing the functional including the final state. After proving the existence and uniqueness of the solution to the given optimal control problem, we get the Frechet differential of the functional and give the necessary condition to the optimal solution in the form of the variational inequality via the solution of the adjoint problem. We constitute a minimizing sequence by the method of projection of the gradient and prove its convergence to the optimal solution.

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