• Title of article

    Rates of convergence for lamplighter processes

  • Author/Authors

    Hنggstr^:om، نويسنده , , Olle and Jonasson، نويسنده , , Johan، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 1997
  • Pages
    23
  • From page
    227
  • To page
    249
  • Abstract
    Consider a graph, G, for which the vertices can have two modes, 0 or 1. Suppose that a particle moves around on G according to a discrete time Markov chain with the following rules. With (strictly positive) probabilities pm, pc and pr it moves to a randomly chosen neighbour, changes the mode of the vertex it is at or just stands still, respectively. We call such a random process a (pm, pc, pr)-lamplighter process on G. Assume that the process starts with the particle in a fixed position and with all vertices having mode 0. The convergence rate to stationarity in terms of the total variation norm is studied for the special cases with G = KN, the complete graph with N vertices, and when G = Z mod N. In the former case we prove that as N → ∞, ((2pc + pm)4pcpm)N log N is a threshold for the convergence rate. In the latter case we show that the convergence rate is asymptotically determined by the cover time CN in that the total variation norm after aN2 steps is given by P(CN > aN2). The limit of this probability can in turn be calculated by considering a Brownian motion with two absorbing barriers. In particular, this means that there is no threshold for this case.
  • Journal title
    Stochastic Processes and their Applications
  • Serial Year
    1997
  • Journal title
    Stochastic Processes and their Applications
  • Record number

    1576057