English

Biharmonic pattern selection

Condensed Matter 2009-10-22 v1

Abstract

A new model to describe fractal growth is discussed which includes effects due to long-range coupling between displacements uu. The model is based on the biharmonic equation 4u=0\nabla^{4}u =0 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 uu is neither zero nor proportional to uu. 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 rL/e1/2r_{\ell}\approx L/e^{1/2} 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 LL and occurs approximately at a distance 60%60 \% 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]