摘要
The global supports of super-Poisson processes and super-random walks with a branching mechanism ψ(z)=z^2 and constant branching rate are known to be noncompact. It turns out that, for any spatially dependent branching rate, this property remains true. However, the asymptotic extinction property for these two kinds of superprocesses depends on the decay rate of the branching-rate function at infinity.
The global supports of super-Poisson processes and super-random walks with a branching mechanism ψ(z)=z^2 and constant branching rate are known to be noncompact. It turns out that, for any spatially dependent branching rate, this property remains true. However, the asymptotic extinction property for these two kinds of superprocesses depends on the decay rate of the branching-rate function at infinity.
基金
NNSF of China (Grant No.10471003)
Foundation for Authors Awarded Excellent Ph.D.Dissertation
