Structure of the particle population for a branching random walk with a critical reproduction law
Abstract
We consider a continuous-time symmetric branching random walk on the ddimensional lattice, d\ge 1 and assume that at the initial moment there is one particle at every lattice point. Moreover, we assume that the underlying random walk has a finite variance of jumps and the reproduction law is described by a critical Bienamye-Galton-Watson process at every lattice point. We study the structure of the particle subpopulation generated by the...
Paper Details
Title
Structure of the particle population for a branching random walk with a critical reproduction law
Published Date
Mar 6, 2019
Journal
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