UNIVERSAL CONDUCTIVITY CURVE FOR A PLANE CONTAINING RANDOM HOLES

被引:70
作者
GARBOCZI, EJ
THORPE, MF
DEVRIES, MS
DAY, AR
机构
[1] MICHIGAN STATE UNIV, DEPT PHYS & ASTRON, E LANSING, MI 48824 USA
[2] MARQUETTE UNIV, DEPT NURSING, MILWAUKEE, WI 53233 USA
来源
PHYSICAL REVIEW A | 1991年 / 43卷 / 12期
关键词
D O I
10.1103/PhysRevA.43.6473
中图分类号
O43 [光学];
学科分类号
070207 ; 0803 ;
摘要
This paper examines the general percolation problem of cutting randomly centered insulating holes in a two-dimensional conducting sheet, and explores how the electrical conductivity-sigma decreases with the remaining area fraction. This problem has been studied in the past for circular, square, and needlelike holes, using both computer simulations and analog experiments. In this paper, we extend these studies by examining cases where the insulating hole is of arbitrary shape, using digital-image-based numerical techniques in conjunction with the Y-del algorithm. We find that, within computational uncertainty, the scaled percolation threshold, x(c) = n(c) <L(eff)2> = 5.9 +/- 0.4, is a universal quantity for all the cases studied, where n(c) is the critical value at percolation of the number of holes per unit area n, and <L(eff)2> is a measure of n(I)-1, the initial slope of the sigma(n) curve, calculated in the few-hole limit and averaged over the different shapes and sizes of the holes used. For elliptical holes, L(eff) = 2(a + b), where a and b are the semimajor and semiminor axes, respectively. All results are well described by the universal conductivity curve: sigma/sigma-0 = [(1 - x/5.90)(1 + x/5.90 - x2/24.97)(1 + x/3.31)-1]1.3, where x = nL(eff)2, and sigma-0 is the conductivity of the sheet before any holes are introduced.
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页码:6473 / 6482
页数:10
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