Droplet growth for three-dimensional Kawasaki dynamics
成果类型:
Article
署名作者:
Den Hollander, F; Nardi, FR; Olivieri, E; Scoppola, E
署名单位:
University of Rome Tor Vergata; Roma Tre University; Consiglio Nazionale delle Ricerche (CNR); Istituto Nazionale per la Fisica della Materia (INFM-CNR)
刊物名称:
PROBABILITY THEORY AND RELATED FIELDS
ISSN/ISSBN:
0178-8051
DOI:
10.1007/s00440-002-0233-3
发表日期:
2003
页码:
153-194
关键词:
metastability
nucleation
摘要:
The goal of this paper is to describe metastability and nucleation for a local version of the three-dimensional lattice gas with Kawasaki dynamics at low temperature and low density. Let Lambda subset of or equal to Z(3) be a large finite box. Particles perform simple exclusion on Lambda, but when they. occupy neighboring sites they feel a binding energy -U < 0 that slows down their dissociation. Along each bond touching the boundary of Lambda from the outside, particles are created with rate rho = epsilon(-Deltabeta) and are annihilated with rate 1, where beta is the inverse temperature and Delta > 0 is an activity parameter. Thus, the boundary of Lambda plays the role of an infinite gas reservoir with density rho. We consider the regime where Delta is an element of (U, 3U) and the initial configuration is such that A is empty. For large beta, the system wants to fill Lambda but is slow in doing so. We investigate how the transition from empty to full takes place under the dynamics. In particular, we identify the size and shape of the critical droplet and the time of its creation in the limit as beta --> infinity.