• Title of article

    Localization in lattice and continuum models of reinforced random walks Original Research Article

  • Author/Authors

    K.J. Painter، نويسنده , , Rolf D. Horstmann، نويسنده , , H.G. Othmer، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2003
  • Pages
    7
  • From page
    375
  • To page
    381
  • Abstract
    We study the singular limit of a class of reinforced random walks on a lattice for which a complete analysis of the existence and stability of solutions is possible. We show that at a sufficiently high total density, the global minimizer of a lattice ‘energy’ or Lyapunov functional corresponds to aggregation at one site. At lower values of the density the stable localized solution coexists with a stable spatially-uniform solution. Similar results apply in the continuum limit, where the singular limit leads to a nonlinear diffusion equation. Numerical simulations of the lattice walk show a complicated coarsening process leading to the final aggregation.
  • Keywords
    Lattice walks , Forward-backward parabolic , Coarsening process , aggregation
  • Journal title
    Applied Mathematics Letters
  • Serial Year
    2003
  • Journal title
    Applied Mathematics Letters
  • Record number

    897510