Chi-Hang Lam, F. G. Shin
Published 1997-09-01Version 1
We demonstrate and explain that conventional finite difference schemes for direct numerical integration do not approximate the continuum Kardar-Parisi-Zhang (KPZ) equation due to microscopic roughness. The effective diffusion coefficient is found to be inconsistent with the nominal one. We propose a novel discretization in 1+1 dimensions which does not suffer from this deficiency and elucidates the reliability and limitations of direct integration approaches.
Comments: 14 pages, 3 figures, RevTex
Discretization-related issues in the KPZ equation: Consistency, Galilean-invariance violation, and fluctuation--dissipation relation
Towards a strong coupling theory for the KPZ equation
Numerical Simulation and the Universality Class of the KPZ Equation for Curved Substrates
