English

Possible Connection between the Optimal Path and Flow in Percolation Clusters

Disordered Systems and Neural Networks 2016-08-16 v1 Statistical Mechanics

Abstract

We study the behavior of the optimal path between two sites separated by a distance rr on a dd-dimensional lattice of linear size LL with weight assigned to each site. We focus on the strong disorder limit, i.e., when the weight of a single site dominates the sum of the weights along each path. We calculate the probability distribution P(optr,L)P(\ell_{\rm opt}|r,L) of the optimal path length opt\ell_{\rm opt}, and find for rLr\ll L a power law decay with opt\ell_{\rm opt}, characterized by exponent goptg_{\rm opt}. We determine the scaling form of P(optr,L)P(\ell_{\rm opt}|r,L) in two- and three-dimensional lattices. To test the conjecture that the optimal paths in strong disorder and flow in percolation clusters belong to the same universality class, we study the tracer path length tr\ell_{\rm tr} of tracers inside percolation through their probability distribution P(trr,L)P(\ell_{\rm tr}|r,L). We find that, because the optimal path is not constrained to belong to a percolation cluster, the two problems are different. However, by constraining the optimal paths to remain inside the percolation clusters in analogy to tracers in percolation, the two problems exhibit similar scaling properties.

Keywords

Cite

@article{arxiv.cond-mat/0510127,
  title  = {Possible Connection between the Optimal Path and Flow in Percolation Clusters},
  author = {Eduardo López and Sergey V. Buldyrev and Lidia A. Braunstein and Shlomo Havlin and H. Eugene Stanley},
  journal= {arXiv preprint arXiv:cond-mat/0510127},
  year   = {2016}
}

Comments

Accepted for publication to Physical Review E. 17 Pages, 6 Figures, 1 Table