• DocumentCode
    1149772
  • Title

    The use of game theory to measure the vulnerability of stochastic networks

  • Author

    Bell, Michael G H

  • Author_Institution
    Dept. of Civil & Environ. Eng., Imperial Coll. of Sci., Technol. & Med., London, UK
  • Volume
    52
  • Issue
    1
  • fYear
    2003
  • fDate
    3/1/2003 12:00:00 AM
  • Firstpage
    63
  • Lastpage
    68
  • Abstract
    Conventional approaches to network reliability analysis are based on either connectivity or capacity. This paper proposes an alternative method which seeks to identify those links or nodes whose failure would impair network performance the most. It is assumed that all links have two costs, a normal cost and a failed cost, both of which can be traffic-dependent. A 2-player, noncooperative, zero-sum game is envisaged between a router, seeking a least-cost path, and a virtual network tester, seeking to maximize trip-cost by failing 1 link. At the mixed strategy Nash equilibrium, link-use probabilities are optimal for the router, and link-failure probabilities are optimal for the tester. Finding the equilibrium involves solving a maximin programming problem. When link costs are fixed (not traffic-dependent), the maximin problem can be recast as a linear programming problem. Two forms of the linear programming problem are presented, one requiring path enumeration, and the other not. The interpretation of the primal and dual variables is elucidated by two propositions. Where link costs are traffic-dependent (e.g., where queuing is a feature), the mixed strategy Nash equilibrium can be found by the VISA (method of successive averages). A numerical example illustrates the approach on a stochastic network with queuing. While the example relates to single commodity e.g., where there are multiple origins and destinations.
  • Keywords
    failure analysis; game theory; linear programming; probability; reliability; stochastic processes; 1 link failure; 2-player noncooperative zero-sum game; connectivity; failed cost; game theory; least-cost path; linear programming problem; link-failure probabilities; link-use probabilities; maximin problem; maximin programming problem; method of successive averages; mixed strategy Nash equilibrium; network reliability analysis; normal cost; path enumeration; queuing; router; stochastic networks vulnerability measurement; trip-cost maximisation; virtual network tester; Capacity planning; Costs; Game theory; Linear programming; Nash equilibrium; Reliability theory; Stochastic processes; Telecommunication traffic; Testing; Traffic control;
  • fLanguage
    English
  • Journal_Title
    Reliability, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0018-9529
  • Type

    jour

  • DOI
    10.1109/TR.2002.808062
  • Filename
    1179799