Caricature of Hydrodynamics for Lattice Dynamics

Abstract

The lattice dynamics in Zd, d1, is considered. The initial data are supposed to be random function. We introduce the family of initial measures \μ0ε,ε>0\ depending on a small scaling parameter ε. We assume that the measures μ0ε are locally homogeneous for space translations of order much less than ε-1 and nonhomogeneous for translations of order ε-1. Moreover, the covariance of μ0ε decreases with distance uniformly in ε. Given τ∈R 0, r∈Rd, and >0, we consider the distributions of random solution in the time moments t=τ/ε and at lattice points close to [r/ε]∈Zd. The main goil is to study the asymptotics of these distributions as ε0 and derive the limit hydrodynamic equations of the Euler or Navier-Stokes type. The similar results are obtained for lattice dynamics in the half-space Zd+.