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Convergence results and sharp estimates for the voter model interfaces

B. Belhouari, Samir and Mountford, Thomas and Sun, Rongfeng and Valle, G. (2006) Convergence results and sharp estimates for the voter model interfaces. ELECTRONIC JOURNAL OF PROBABILITY, 11 (30). pp. 768-801. ISSN 1083-6489

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Abstract

We study the evolution of the interface for the one-dimensional voter model. We show that if the random walk kernel associated with the voter model has finite th moment for some gamma > 3, then the evolution of the interface boundaries converge weakly to a Brownian motion under diffusive scaling. This extends recent work of Newman, Ravishankar and Sun. Our result is optimal in the sense that finite th moment is necessary for this convergence for all gamma in (0, 3). We also obtain relatively sharp estimates for the tail distribution of the size of the equilibrium interface, extending earlier results of Cox and Durrett, and Belhaouari, Mountford and Valle

Item Type:Article
Impact Factor:0.7
Subjects:R Medicine > RZ Other systems of medicine
Q Science > QA Mathematics > QA75 Electronic computers. Computer science
Departments / MOR / COE:Departments > Fundamental & Applied Sciences
ID Code:2718
Deposited By: Dr Samir Brahim Belhaouari
Deposited On:16 Mar 2011 06:10
Last Modified:19 Jan 2017 08:27

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