• DocumentCode
    1505491
  • Title

    Feedback Optimal Control of Distributed Parameter Systems by Using Finite-Dimensional Approximation Schemes

  • Author

    Alessandri, A. ; Gaggero, Mauro ; Zoppoli, R.

  • Author_Institution
    DIME, Univ. of Genoa, Genoa, Italy
  • Volume
    23
  • Issue
    6
  • fYear
    2012
  • fDate
    6/1/2012 12:00:00 AM
  • Firstpage
    984
  • Lastpage
    996
  • Abstract
    Optimal control for systems described by partial differential equations is investigated by proposing a methodology to design feedback controllers in approximate form. The approximation stems from constraining the control law to take on a fixed structure, where a finite number of free parameters can be suitably chosen. The original infinite-dimensional optimization problem is then reduced to a mathematical programming one of finite dimension that consists in optimizing the parameters. The solution of such a problem is performed by using sequential quadratic programming. Linear combinations of fixed and parameterized basis functions are used as the structure for the control law, thus giving rise to two different finite-dimensional approximation schemes. The proposed paradigm is general since it allows one to treat problems with distributed and boundary controls within the same approximation framework. It can be applied to systems described by either linear or nonlinear elliptic, parabolic, and hyperbolic equations in arbitrary multidimensional domains. Simulation results obtained in two case studies show the potentials of the proposed approach as compared with dynamic programming.
  • Keywords
    approximation theory; control system synthesis; distributed control; dynamic programming; elliptic equations; feedback; mathematical programming; optimal control; parabolic equations; partial differential equations; quadratic programming; approximation framework; approximation stems; boundary controls; distributed controls; distributed parameter systems; dynamic programming; feedback controller design; feedback optimal control; finite dimensional approximation schemes; fixed structure; infinite dimensional optimization problem; linear combinations; mathematical programming; nonlinear elliptic equations; nonlinear hyperbolic equations; nonlinear parabolic equations; partial differential equations; quadratic programming; Approximation methods; Equations; Feedback control; Heating; Mathematical model; Optimal control; Slabs; Approximation scheme; distributed parameter system; neural network; optimal control;
  • fLanguage
    English
  • Journal_Title
    Neural Networks and Learning Systems, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    2162-237X
  • Type

    jour

  • DOI
    10.1109/TNNLS.2012.2192748
  • Filename
    6192328