• DocumentCode
    883709
  • Title

    An Efficient Maximization Algorithm With Implications in Min-Max Predictive Control

  • Author

    Alamo, T. ; de La Peña, D. Muñoz ; Camacho, E.F.

  • Author_Institution
    Dept. de Ing. de Sist. y Autom., Univ. de Sevilla, Sevilla
  • Volume
    53
  • Issue
    9
  • fYear
    2008
  • Firstpage
    2192
  • Lastpage
    2197
  • Abstract
    In this technical note, an algorithm for binary quadratic programs defined by matrices with band structure is proposed. It was shown in the article by T. Alamo, D. M. de la Pentildea, D. Limon, and E. F. Camacho, ldquoConstrained min-max predictive control: modifications of the objective function leading to polynomial complexity,rdquo IEEE Tran. Autom. Control, vol. 50, pp. 710-714, May 2005, that this class of problems arise in robust model predictive control when min-max techniques are applied. Although binary quadratic problems belongs to a class of NP-complete problems, the computational burden of the proposed maximization algorithm for band matrices is polynomial with the dimension of the optimization variable and exponential with the band size. Computational results and comparisons on several hundred test problems demonstrate the efficiency of the algorithm.
  • Keywords
    minimax techniques; polynomial matrices; predictive control; quadratic programming; robust control; NP-complete problems; band matrices; band structure; binary quadratic programs; efficient maximization algorithm; min-max techniques; robust model predictive control; Linear systems; NP-complete problem; Polynomials; Predictive control; Predictive models; Quadratic programming; Robust control; Testing; Traffic control; Uncertainty; Band matrices; binary quadratic programming; combinatorial optimization; min-max techniques; model predictive control;
  • fLanguage
    English
  • Journal_Title
    Automatic Control, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0018-9286
  • Type

    jour

  • DOI
    10.1109/TAC.2008.921001
  • Filename
    4639438