• DocumentCode
    1352044
  • Title

    Cut-Set Intersections and Node Partitions

  • Author

    Buzacott, J.A. ; Chang, Jack S.K.

  • Author_Institution
    Department of Management Sciences; University of Waterloo; Waterloo, Ontario, N2L 3G1 CANADA.
  • Issue
    5
  • fYear
    1984
  • Firstpage
    385
  • Lastpage
    389
  • Abstract
    With any cut set of a graph can be associated a partition of the nodes into two cells. We show that each cut-set intersection term in the cut-set inclusion and exclusion formula can be associated with a k-cell partition of the nodes. Thus, the number of distinct terms in the cut-set inclusion and exclusion formula cannot exceed the number of partitions of the set of nodes. This leads to a simplified formula for graph reliability: the node partition formula, When finding the overall reliability in complete graphs no terms cancel, thus the number of terms is equal to the number of partitions. In other graphs we show that the number of non-cancelling terms in the cut-set inclusion and exclusion formula is equal to the number of minimal partition sets of the graph. It follows that cut-set inclusion and exclusion is inherently an inefficient method for the exact calculation of network reliability measures.
  • Keywords
    Combinatorial mathematics; Graph theory; Joining IEEE; Lifting equipment; Partitioning algorithms; Reliability theory; Cut-set inclusion and exclusion; Cut-set intersection; Network reliability; Node partition;
  • fLanguage
    English
  • Journal_Title
    Reliability, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0018-9529
  • Type

    jour

  • DOI
    10.1109/TR.1984.5221875
  • Filename
    5221875