• DocumentCode
    1082775
  • Title

    Constraint Theory, Part I: Fundamentals

  • Author

    Friedman, George J. ; Leondes, Cornelius T.

  • Author_Institution
    Northrop Systems Laboratories, Palos Verdes, Calif.
  • Volume
    5
  • Issue
    1
  • fYear
    1969
  • Firstpage
    48
  • Lastpage
    56
  • Abstract
    The purpose of this paper is to develop an analytic foundation for the determination of whether a mathematical model and its desired computations are "well-posed" in order to help alleviate the software problems associated with the simulation of complex large-scale systems by heterogeneous mathematical models involving several hundred dimensions. The problem is approached by providing a rigorous basis for the commonplace notion of constraint. Four distinct viewpoints of the mathematical model are established: 1) the set theoretic relation space; 2) the family of submodels; 3) the bipartite graph, which provides topological insight; and 4) the constraint matrix. Fundamental definitions of mathematical model consistency, computational allowability, and extrinsic and intrinsic constraint are established on a set theory basis. Correspondences are proved between the topological properties of a model\´s graph and its constraint properties. Variables located in different connected components of a graph are always mutually consistent, but computations performed on them are never allowable. If a model graph of universal relations has a tree structure, then all its variables are mutually consistent. Detailed treatment of special relation classes will be given in Parts II and III.
  • Keywords
    Automatic control; Constraint theory; Linear systems; MIMO; Mathematical model; Military computing; Poles and zeros; Reproducibility of results; State feedback; State-space methods;
  • fLanguage
    English
  • Journal_Title
    Systems Science and Cybernetics, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0536-1567
  • Type

    jour

  • DOI
    10.1109/TSSC.1969.300244
  • Filename
    4082203