Chair of Computational Mathematics Seminar: Approximate control of parabolic equations by spectral decomposition

Chair of Computational Mathematics Seminar: Approximate control of parabolic equations by spectral decomposition
06/16/2017
12:00 – 13:00
Central Meeting Room at DeustoTech . DeustoTech ­ University of Deusto Av. de las Universidades, 24 48007 Bilbao ­ Basque Country ­ Spain
 
Martin Lazar

University of Dubrovnik, ?Dubrovnik, Croatia

Cesare Molinari

Universidad Técnica Federico Santa María, Valparaíso, Chile.

Abstract:
We consider the constrained minimisation problem where is some given target state, J is a given cost functional and x is the solution of If the cost functional J is given by the problem (P) is reduced to a classical minimal norm control problem which can be solved by Hilbert uniqueness method (HUM). In this paper we allow for a more general cost functional and analyse examples in which, apart from the target state and the control norm, one considers a desired trajectory and penalise a distance of the state from it. Such problem requires a more general approach, and it has been addressed by dierent methods throughout last decades.

In this paper we suggest another method based on the spectral decomposition in terms of eigenfunctions of the operator A . Surprisingly, the problem reduces to an algebraic equation for a scalar unknown, representing a Lagrangian multiplier. The same approach has been recently introduced in [1] for an optimal control problem of the heat equation in which the control was given through the initial datum.
This paper generalises the method to the distributed control problems. As can be expected, in this case one has to consider the associated dual problem which makes the calculation more complicated, although the algorithm steps follow a similar structure as in [1]. In the talk basic steps of the method will be explained, followed by numerical examples demonstrating its efficiency.

 
  • Share this content:
  • E-mail
  • Linkedin
  • X
  • Add event to calendar:

Leave a Reply

Your email address will not be published. Required fields are marked *

You may use these HTML tags and attributes: <a href="" title=""> <abbr title=""> <acronym title=""> <b> <blockquote cite=""> <cite> <code> <del datetime=""> <em> <i> <q cite=""> <strike> <strong>