Internal Diffusion Limited Aggregation on Discrete Groups Having Exponential Growth

Internal Diffusion Limited Aggregation on Discrete Groups Having Exponential Growth

The internal diffusion limited aggregation (DLA) has been introduced by Diaconis and Fulton [Rend. Sem. Mat. Univ. Pol. Torino 49, 95-119 (1991)]. It is a growth model defined on an infinite set and associated to a Markov chain on this set. We focus here on sets which are finitely generated groups w...

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Veröffentlicht in:Probability theory and related fields 2007-03, Vol.137 (3-4), p.323-343
Hauptverfasser: Blachère, Sébastien, Brofferio, Sara
Format: Artikel
Sprache:eng
Schlagworte:
Agglomeration
Green's functions
Growth models
Markov analysis
Markov chains
Mathematics
Phase transitions
Probability
Random variables
Random walk
Random walk theory
Studies
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Zusammenfassung:The internal diffusion limited aggregation (DLA) has been introduced by Diaconis and Fulton [Rend. Sem. Mat. Univ. Pol. Torino 49, 95-119 (1991)]. It is a growth model defined on an infinite set and associated to a Markov chain on this set. We focus here on sets which are finitely generated groups with exponential growth. We prove a shape theorem for the internal DLA on such groups associated to symmetric random walks. For that purpose, we introduce a new distance associated to the Green function, which happens to have some interesting properties. In the case of homogeneous trees, we also get the right order for the fluctuations of that model around its limiting shape. [PUBLICATION ABSTRACT]
ISSN:0178-8051
1432-2064
DOI:10.1007/s00440-006-0009-2