Energy Decay in Burgers Turbulence and Interface Growth. the Problem of Random Initial Conditions - II

Abstract

We present a study of the Burgers equation in one and two dimensions d=1,2 following the analytic approach indicated in the previous paper I. For the problem of the initial conditions decay we consider two classes of initial condition distributions Q1,2 [-(1/4D)∫(∇h)2d x] where h-field is unbounded (Q1) or bounded (Q2, |h|≤ H). Avoiding the replica trick and using an integral representation of the logarithm we study the tractable field theory which has d=2 as a critical dimension. It is shown that the degenerate one-dimensional case has three stages of decay, when the kinetic energy density diminishes with time as t-2/3, t-2, t-3/2 contrary to the predictions of the similarity hypothesis based on the second-order correlator of the distribution. In two dimensions we find the kinetic energy decay which is proportional to t-1-1/2(t). It is shown that the pure diffusion equation with the Q2-type initial condition has non-trivial energy decay exponents indicating connection with the O(2) non-linear σ-model.

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