• DocumentCode
    1956707
  • Title

    SVD based reduction for subdivided rule bases

  • Author

    Baranyi, Péter ; Yam, Yeung ; Yang, Chi-Tin ; Várkonyi-Kóczy, Annamária

  • Author_Institution
    Res. Group for Mech., Hungarian Acad. of Sci., Budapest, Hungary
  • Volume
    2
  • fYear
    2000
  • fDate
    2000
  • Firstpage
    712
  • Abstract
    This paper is motivated by the fact that though fuzzy and B-spline techniques are popular engineering tools, their utilisation is being restricted by their exponential complexity property. As a result SVD based reduction techniques have emerged. These methods apply singular value decomposition to the characteristic matrix of the rule base. The maximum size of the rule base taken into consideration is limited by size of operation memory available for singular value decomposition. The method proposed in this paper is capable of applying singular value decomposition step by step to the partitions of the rule base. Therefore, using the proposed extension, there is no limit, theoretically, for the size of the rule bases
  • Keywords
    fuzzy control; fuzzy set theory; knowledge based systems; matrix algebra; singular value decomposition; splines (mathematics); B-spline; fuzzy control; fuzzy rule base; fuzzy set theory; singular value decomposition; Approximation algorithms; Automation; Fuzzy control; Fuzzy sets; Inference algorithms; Information systems; Input variables; Interpolation; Singular value decomposition; Telematics;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Fuzzy Systems, 2000. FUZZ IEEE 2000. The Ninth IEEE International Conference on
  • Conference_Location
    San Antonio, TX
  • ISSN
    1098-7584
  • Print_ISBN
    0-7803-5877-5
  • Type

    conf

  • DOI
    10.1109/FUZZY.2000.839119
  • Filename
    839119