论文信息 - An invariance principle for the edge of the branching exclusion process

An invariance principle for the edge of the branching exclusion process

We consider the one dimensional nearest neighbor branching exclusion process with initial configurations having a rightmost particle. We prove that, conveniently rescaled, the position of the rightmost particle (edge) converges to a nondegenerate Brownian motion. Convergence to a convex combination of measures concentrating on the full and empty configurations at the average position of the edge is established. A shape theorem for the process starting with a finite number of particles is also proven.

Pablo A. Ferrari | Camillo Cammarota

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