Percolation on the stationary distributions of the voter model
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Balázs Ráth [2] ; Daniel Valesin [1]
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[1] University of Groningen
University of Groningen
Países Bajos
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[2] MTA-BME Stochastics Research Group
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- Localización: Annals of probability: An official journal of the Institute of Mathematical Statistics, ISSN 0091-1798, Vol. 45, Nº. 3, 2017, págs. 1899-1951
- Idioma: inglés
- Enlaces
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Resumen
The voter model on ZdZd is a particle system that serves as a rough model for changes of opinions among social agents or, alternatively, competition between biological species occupying space. When d≥3d≥3, the set of (extremal) stationary distributions is a family of measures μαμα, for αα between 0 and 1. A configuration sampled from μαμα is a strongly correlated field of 0’s and 1’s on ZdZd in which the density of 1’s is αα. We consider such a configuration as a site percolation model on ZdZd. We prove that if d≥5d≥5, the probability of existence of an infinite percolation cluster of 1’s exhibits a phase transition in αα. If the voter model is allowed to have sufficiently spread-out interactions, we prove the same result for d≥3d≥3.
