• Title of article

    Random Walk in an Alcove of an Affine Weyl Group, and Non-colliding Random Walks on an Interval

  • Author/Authors

    Grabiner، نويسنده , , David J.، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2002
  • Pages
    22
  • From page
    285
  • To page
    306
  • Abstract
    We use a reflection argument, introduced by Gessel and Zeilberger, to count the number of k-step walks between two points which stay within a chamber of a Weyl group. We apply this technique to walks in the alcoves of the classical affine Weyl groups. In all cases, we get determinant formulas for the number of k-step walks. One important example is the region m>x1>x2>…>xn>0, which is a rescaled alcove of the affine Weyl group Cn. If each coordinate is considered to be an independent particle, this models n non-colliding random walks on the interval (0, m). Another case models n non-colliding random walks on a circle.
  • Keywords
    random walk , affine Weyl group , Lattice path enumeration , Weyl chamber , alcove , reflection principle
  • Journal title
    Journal of Combinatorial Theory Series A
  • Serial Year
    2002
  • Journal title
    Journal of Combinatorial Theory Series A
  • Record number

    1530685