We present a self-organized model for the growth of two- and
three-dimensional percolation clusters in multi-layered structures.
Anisotropy in the medium is modeled by randomly allocating layers of
different physical properties. A controlling mechanism for the growing
aggregate perimeter is introduced in such a manner that the system
self-tunes to a stationary regime that corresponds to the percolation
threshold. The critical probability for infinite growth is studied as a
function of the anisotropy of the medium.
%0 Journal Article
%1 WOS:000277180600012
%A Parteli, Eric J R
%A da Silva, Luciano R
%A Jr., Jose S Andrade
%C TEMPLE CIRCUS, TEMPLE WAY, BRISTOL BS1 6BE, ENGLAND
%D 2010
%I IOP PUBLISHING LTD
%J JOURNAL OF STATISTICAL MECHANICS-THEORY AND EXPERIMENT
%K (theory); (theory)} criticality disordered fractal growth problems self-organized systems {percolation
%R 10.1088/1742-5468/2010/03/P03026
%T Self-organized percolation in multi-layered structures
%X We present a self-organized model for the growth of two- and
three-dimensional percolation clusters in multi-layered structures.
Anisotropy in the medium is modeled by randomly allocating layers of
different physical properties. A controlling mechanism for the growing
aggregate perimeter is introduced in such a manner that the system
self-tunes to a stationary regime that corresponds to the percolation
threshold. The critical probability for infinite growth is studied as a
function of the anisotropy of the medium.
@article{WOS:000277180600012,
abstract = {We present a self-organized model for the growth of two- and
three-dimensional percolation clusters in multi-layered structures.
Anisotropy in the medium is modeled by randomly allocating layers of
different physical properties. A controlling mechanism for the growing
aggregate perimeter is introduced in such a manner that the system
self-tunes to a stationary regime that corresponds to the percolation
threshold. The critical probability for infinite growth is studied as a
function of the anisotropy of the medium.},
added-at = {2022-05-23T20:00:14.000+0200},
address = {TEMPLE CIRCUS, TEMPLE WAY, BRISTOL BS1 6BE, ENGLAND},
author = {Parteli, Eric J R and da Silva, Luciano R and Jr., Jose S Andrade},
biburl = {https://www.bibsonomy.org/bibtex/2b617817bda2e07a61228b68f5d50855d/ppgfis_ufc_br},
doi = {10.1088/1742-5468/2010/03/P03026},
interhash = {28212340cbe57860b1d369932ceee3ba},
intrahash = {b617817bda2e07a61228b68f5d50855d},
issn = {1742-5468},
journal = {JOURNAL OF STATISTICAL MECHANICS-THEORY AND EXPERIMENT},
keywords = {(theory); (theory)} criticality disordered fractal growth problems self-organized systems {percolation},
publisher = {IOP PUBLISHING LTD},
pubstate = {published},
timestamp = {2022-05-23T20:00:14.000+0200},
title = {Self-organized percolation in multi-layered structures},
tppubtype = {article},
year = 2010
}