• Title of article

    Lagrangian statistical mechanics applied to non-linear stochastic field equations

  • Author/Authors

    Sam F. Edwards، نويسنده , , Moshe Schwartz، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2002
  • Pages
    30
  • From page
    357
  • To page
    386
  • Abstract
    We consider non-linear stochastic field equations such as the KPZ equation for deposition and the noise driven Navier–Stokes equation for hydrodynamics. We focus on the Fourier transform of the time dependent two-point field correlation, Φk(t). We employ a Lagrangian method aimed at obtaining the distribution function of the possible histories of the system in a way that fits naturally with our previous work on the static distribution. Our main result is a non-linear integro-differential equation for Φk(t), which is derived from a Peierls–Boltzmann type transport equation for its Fourier transform in time Φk,ω. That transport equation is a natural extension of the steady state transport equation, we previously derived for Φk(0). We find a new and remarkable result which applies to all the non-linear systems studied here. The long time decay of Φk(t) is described by Φk(t) exp(−aktγ), where a is a constant and γ is system dependent.
  • Journal title
    Physica A Statistical Mechanics and its Applications
  • Serial Year
    2002
  • Journal title
    Physica A Statistical Mechanics and its Applications
  • Record number

    867522