• DocumentCode
    3088215
  • Title

    Decentralized control of service rates in a closed Jackson network

  • Author

    Yao, D.D. ; Schechner, Z.

  • Author_Institution
    Harvard University, Cambridge, MA
  • Volume
    26
  • fYear
    1987
  • fDate
    9-11 Dec. 1987
  • Firstpage
    1487
  • Lastpage
    1490
  • Abstract
    Consider a closed Jackson network with M nodes. The service rate at each node is controllable in a decentralized manner, i.e., it will be controlled based on local information extracted from that node only. For each node, there is a holding cost and an operating cost. Assume that both costs are time-homogeneous, and that the operating cost is a linear function of the service rate. Allow, however, both costs to be arbitrary functions of the number of jobs at the node. The objective is to minimize the time-average expected total cost. We show that there exists an optimal control characterized by a set of thresholds (one for each node), such that it is optimal for each node to serve at zero rates if the number of jobs there is below or at the threshold, and serve at maximum allowed rates when the number of jobs exceeds the threshold. The model also allows additional constraints (on average delay or throughput, for instance) to be imposed at each node. In this case, the optimal threshold control is adjusted by adding a set of randomized points, the number of which equals the number of additional constraints.
  • Keywords
    Cost function; Data mining; Delay; Distributed control; Equations; Industrial engineering; Linear programming; Operations research; Optimal control; Throughput;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Decision and Control, 1987. 26th IEEE Conference on
  • Conference_Location
    Los Angeles, California, USA
  • Type

    conf

  • DOI
    10.1109/CDC.1987.272663
  • Filename
    4049535