Different clustering regimes in systems of hierarchically interacting diffusions
成果类型:
Article
署名作者:
Klenke, A
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
发表日期:
1996
页码:
660-697
关键词:
voter model
摘要:
We study a system of interacting diffusions dx xi(t) = Sigma(zeta is an element of Xi) a(xi,zeta)(x(zeta)(t) - x(xi)(t))dt + root g(x xi(t)) dW xi(t) (xi is an element of Xi), indexed by the hierarchical group Xi, as a genealogical two genotype model [where x(xi)(t) denotes the frequency of, say, type A] with hierarchically determined degrees of relationship between colonies. In the case of short interaction range it is known that the system clusters. That is, locally one genotype dies out. We focus on the description of the different regimes of cluster growth which is shown to depend on the interaction kernel a(.,.) via its recurrent potential kernel. One of these regimes will be further investigated by mean-field methods. For general interaction range we shall also relate the behavior of large finite systems, indexed by finite subsets Xi(n) of Xi, to that of the infinite system. On the way we will establish relations between hitting times of random walks and their potentials.