PERCOLATION CRITICAL EXPONENTS UNDER THE TRIANGLE CONDITION
成果类型:
Article
署名作者:
BARSKY, DJ; AIZENMAN, M
署名单位:
New York University
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/aop/1176990221
发表日期:
1991
页码:
1520-1536
关键词:
long-range interactions
critical-behavior
infinite-cluster
inequalities
models
摘要:
For independent percolation models, it is shown that if the diagrammatic triangle condition is satisfied, then the critical exponents-delta and beta exist and take their mean-field values, generalizing the criterion introduced in 1984 by Aizenman and Newman for the mean-field value of gamma in nonoriented percolation. The results apply to a broad class of nonoriented, as well as oriented, weakly homogeneous models, in which the range of the connecting bonds need not be bounded. For the nonoriented case, the condition reduces to the finiteness at the critical point of nabla = SIGMA(x,y)tau(0,x)tau(x,y)tau(y,0) [with tau(u, v) the probability that the site u is connected to v], which was recently established by Hara and Slade for models with sufficiently spread out connections in d > 6 dimensions. Our analysis proceeds through the derivation of complementary differential inequalities for the percolation order parameter M(beta, h)-whose value at h = 0+ yields the percolation density, with beta-parametrizing the bond, or site, occupation probabilities and with h, h greater-than-or-equal-to 0, a ghost field. The conclusion is that under the triangle condition, in the vicinity of the critical point (beta-c, 0), M(beta, 0+) almost-equal-to (beta - beta-c)beta+ and M(beta-c, h) almost-equal-to h1/delta, with beta = 1 and delta = 2.