• DocumentCode
    1101116
  • Title

    Information flow and cooperative control of vehicle formations

  • Author

    Fax, J. Alexander ; Murray, Richard M.

  • Author_Institution
    Northrop Grumman Electron. Syst., Woodland Hills, CA, USA
  • Volume
    49
  • Issue
    9
  • fYear
    2004
  • Firstpage
    1465
  • Lastpage
    1476
  • Abstract
    We consider the problem of cooperation among a collection of vehicles performing a shared task using intervehicle communication to coordinate their actions. Tools from algebraic graph theory prove useful in modeling the communication network and relating its topology to formation stability. We prove a Nyquist criterion that uses the eigenvalues of the graph Laplacian matrix to determine the effect of the communication topology on formation stability. We also propose a method for decentralized information exchange between vehicles. This approach realizes a dynamical system that supplies each vehicle with a common reference to be used for cooperative motion. We prove a separation principle that decomposes formation stability into two components: Stability of this is achieved information flow for the given graph and stability of an individual vehicle for the given controller. The information flow can thus be rendered highly robust to changes in the graph, enabling tight formation control despite limitations in intervehicle communication capability.
  • Keywords
    control system synthesis; cooperative systems; graph theory; position control; stability; time-varying systems; traffic control; vehicles; Nyquist criterion; communication network; communication topology; cooperative control; decentralized information exchange; dynamical systems; formation stability; graph Laplacian matrix; graph theory; information flow; intervehicle communication; multivehicle control; Communication networks; Communication system control; Eigenvalues and eigenfunctions; Graph theory; Laplace equations; Matrix decomposition; Network topology; Robust control; Stability criteria; Vehicles; Cooperative control; Laplacian; graph theory; multivehicle control; stability;
  • fLanguage
    English
  • Journal_Title
    Automatic Control, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0018-9286
  • Type

    jour

  • DOI
    10.1109/TAC.2004.834433
  • Filename
    1333200