• DocumentCode
    3167212
  • Title

    Interval-related problems on reconfigurable meshes

  • Author

    Olariu, Stcphan ; Schwing, James L. ; Zhang, Jingyuan

  • Author_Institution
    Dept. of Comput. Sci., Old Dominion Univ., Norfolk, VA, USA
  • fYear
    1992
  • fDate
    4-7 Aug 1992
  • Firstpage
    445
  • Lastpage
    455
  • Abstract
    Interval graphs provide a natural model for a vast number of scheduling and VLSI problems. A variety of interval graph problems have been solved on the PRAM family. Recently, a powerful architecture called the reconfigurable mesh has been proposed: in essence, a reconfigurable mesh consists of a mesh-connected architecture augmented by a dynamically reconfigurable bus system. It has been argued that the regular structure of the reconfigurable mesh is suitable for VLSI implementation. The authors develop a set of tools and show how they can be used to devise constant time algorithms to solve a number of interval-related problem on reconfigurable meshes. These problems include finding a maximum independent set, a minimum clique cover, a minimum dominating set, a minimum coloring, along with algorithms to compute the shortest path between a pair of intervals and, based on the shortest path, an algorithm to find the center of an interval graph. More precisely, with an arbitrary family of n intervals as input, all their algorithms run in constant time on a reconfigurable mesh of size n×n
  • Keywords
    VLSI; parallel algorithms; reconfigurable architectures; scheduling; PRAM family; VLSI; dynamically reconfigurable bus system; interval related problems; maximum independent set; minimum clique cover; minimum coloring; minimum dominating set; reconfigurable meshes; scheduling; Circuits; Computational modeling; Engineering management; NASA; Very large scale integration;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Application Specific Array Processors, 1992. Proceedings of the International Conference on
  • Conference_Location
    Berkeley, CA
  • ISSN
    1063-6862
  • Print_ISBN
    0-8186-2967-3
  • Type

    conf

  • DOI
    10.1109/ASAP.1992.218553
  • Filename
    218553