SHARP METASTABILITY THRESHOLD FOR AN ANISOTROPIC BOOTSTRAP PERCOLATION MODEL

SHARP METASTABILITY THRESHOLD FOR AN ANISOTROPIC BOOTSTRAP PERCOLATION MODEL

Bootstrap percolation models have been extensively studied during the two past decades. In this article, we study the following "anisotropic" bootstrap percolation model: the neighborhood of a point (m, n) is the set {(m + 2, n), (m + 1, n), (m, n + 1), (m — 1, n), (m — 2, n), (m, n — 1)}....

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Veröffentlicht in:The Annals of probability 2013-05, Vol.41 (3), p.1218-1242
Hauptverfasser: Duminil-Copin, H., Van Enter, A. C. D.
Format: Artikel
Sprache:eng
Schlagworte:
60K35
83B43
83C43
Anisotropy
Bootstrap method
Bootstrap percolation
Cardinality
Cellular automata
Descendants
Mathematical growth
Mathematical models
Metastability
Probability
Proof theory
Rectangles
Set theory
sharp threshold
Studies
Two dimensional modeling
Vertices
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Beschreibung
Zusammenfassung:Bootstrap percolation models have been extensively studied during the two past decades. In this article, we study the following "anisotropic" bootstrap percolation model: the neighborhood of a point (m, n) is the set {(m + 2, n), (m + 1, n), (m, n + 1), (m — 1, n), (m — 2, n), (m, n — 1)}. At time 0, sites are occupied with probability p. At each time step, sites that are occupied remain occupied, while sites that are not occupied become occupied if and only if three of more sites in their neighborhood are occupied. We prove that it exhibits a sharp metastability threshold. This is the first mathematical proof of a sharp threshold for an anisotropic bootstrap percolation model.
ISSN:0091-1798
2168-894X
DOI:10.1214/11-AOP722