The Galerkin-truncated Burgers equation: Crossover from inviscid-thermalised to Kardar-Parisi-Zhang scaling

Abstract

The one-dimensional (1D) Galerkin-truncated Burgers equation, with both dissipation and noise terms included, is studied using spectral methods. When the truncation-scale Reynolds number R min is varied, from very small values to order 1 values, the scale-dependent correlation time τ(k) is shown to follow the expected crossover from the short-distance τ(k) k-2 Edwards-Wilkinson scaling to the universal long-distance Kardar-Parisi-Zhang scaling τ(k) k-3/2. In the inviscid limit: R min ∞, we show that the system displays another crossover to the Galerkin-truncated inviscid-Burgers regime that admits thermalised solutions with τ(k) k-1. The scaling form of the time-correlation functions are shown to follow the known analytical laws and the skewness and excess kurtosis of the interface increments distributions are characterised.