SHARPNESS OF THE PERCOLATION TRANSITION IN THE TWO-DIMENSIONAL CONTACT PROCESS
成果类型:
Article
署名作者:
van den Berg, J.
署名单位:
Centrum Wiskunde & Informatica (CWI); Vrije Universiteit Amsterdam
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
DOI:
10.1214/10-AAP702
发表日期:
2011
页码:
374-395
关键词:
zero-one law
critical probability
ising percolation
PHASE-TRANSITION
product-spaces
models
threshold
plane
摘要:
For ordinary (independent) percolation on a large class of lattices it is well known that below the critical percolation parameter pc the cluster size distribution has exponential decay and that power-law behavior of this distribution can only occur at pc. This behavior is often called sharpness of the percolation transition. For theoretical reasons, as well as motivated by applied research, there is an increasing interest in percolation models with (weak) dependencies. For instance, biologists and agricultural researchers have used (stationary distributions of) certain two-dimensional contact-like processes to model vegetation patterns in an arid landscape (see [20]). In that context occupied clusters are interpreted as patches of vegetation. For some of these models it is reported in [20] that computer simulations indicate power-law behavior in some interval of positive length of a model parameter. This would mean that in these models the percolation transition is not sharp. This motivated us to investigate similar questions for the ordinary (basic) 2D contact process with parameter lambda. We show, using techniques from Bollobas and Riordan [8, 11], that for the upper invariant measure (nu) over bar lambda of this process the percolation transition is sharp. If lambda is such that ((nu) over bar (lambda)-a.s.) there are no infinite clusters, then for all parameter values below lambda the cluster-size distribution has exponential decay.
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