Biharmonic pattern selection
Abstract
A new model to describe fractal growth is discussed which includes effects due to long-range coupling between displacements . The model is based on the biharmonic equation in two-dimensional isotropic defect-free media as follows from the Kuramoto-Sivashinsky equation for pattern formation -or, alternatively, from the theory of elasticity. As a difference with Laplacian and Poisson growth models, in the new model the Laplacian of is neither zero nor proportional to . Its discretization allows to reproduce a transition from dense to multibranched growth at a point in which the growth velocity exhibits a minimum similarly to what occurs within Poisson growth in planar geometry. Furthermore, in circular geometry the transition point is estimated for the simplest case from the relation such that the trajectories become stable at the growing surfaces in a continuous limit. Hence, within the biharmonic growth model, this transition depends only on the system size and occurs approximately at a distance far from a central seed particle. The influence of biharmonic patterns on the growth probability for each lattice site is also analysed.
Keywords
Cite
@article{arxiv.cond-mat/9210017,
title = {Biharmonic pattern selection},
author = {Wei Wang and E. Canessa},
journal= {arXiv preprint arXiv:cond-mat/9210017},
year = {2009}
}
Comments
To appear in Phys. Rev. E. Copies upon request to [email protected]