• Title of article

    Optimal cell flipping to minimize channel density in VLSI design and pseudo-Boolean optimization Original Research Article

  • Author/Authors

    Endre Boros، نويسنده , , Peter L Hammer، نويسنده , , Michel Minoux، نويسنده , , David J. Rader Jr.، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 1998
  • Pages
    20
  • From page
    69
  • To page
    88
  • Abstract
    Cell flipping in VLSI design is an operation in which some of the cells are replaced with their “mirror images” with respect to a vertical axis, while keeping them in the same slot. After the placement of all the cells, one can apply cell flipping in order to further decrease the total area, approximating this objective by minimizing total wire length, channel width, etc. However, finding an optimal set of cells to be flipped is usually a difficult problem. In this paper we show that cell flipping can be efficiently applied to minimize channel density in the standard cell technology. We show that an optimal flipping pattern can be found in O(p(nc)c) time, where n, p and c denote the number of nets, pins and channels, respectively. Moreover, in the one channel case (i.e. when c = 1) the cell flipping problem can be solved in O(p log n) time. For the multi-channel case we present both an exact enumeration scheme and a mixed-integer program that generates an approximate solution very quickly. We present computational results on examples up to 139 channels and 65000 cells.
  • Journal title
    Discrete Applied Mathematics
  • Serial Year
    1998
  • Journal title
    Discrete Applied Mathematics
  • Record number

    884847