• Title of article

    Geometrically constrained statistical systems on regular and random lattices: From folding to meanders

  • Author/Authors

    Di Francesco، نويسنده , , P. and Guitter، نويسنده , , E.، نويسنده ,

  • Pages
    88
  • From page
    1
  • To page
    88
  • Abstract
    We review a number a recent advances in the study of two-dimensional statistical models with strong geometrical constraints. These include folding problems of regular and random lattices as well as the famous meander problem of enumerating the topologically inequivalent configurations of a meandering road crossing a straight river through a given number of bridges. All these problems turn out to have reformulations in terms of fully-packed loop models allowing for a unified Coulomb gas description of their statistical properties. A number of exact results and physically motivated conjectures are presented in detail, including the remarkable meander configuration exponent α = ( 29 + 145 ) / 12 .
  • Keywords
    Fully-packed loops , Meanders , Eulerian gravity , Coloring , folding , Hamiltonian cycles
  • Journal title
    Astroparticle Physics
  • Record number

    2004052