Clustering of branching Brownian motions in confined geometries.


We study the evolution of a collection of individuals subject to Brownian diffusion, reproduction, and disappearance. In particular, we focus on the case where the individuals are initially prepared at equilibrium within a confined geometry. Such systems are widespread in physics and biology and apply for instance to the study of neutron populations in… (More)


Cite this paper

@article{Zoia2014ClusteringOB, title={Clustering of branching Brownian motions in confined geometries.}, author={Andrea Zoia and Eric Dumonteil and Alain Mazzolo and C de Mulatier and Alberto Rosso}, journal={Physical review. E, Statistical, nonlinear, and soft matter physics}, year={2014}, volume={90 4}, pages={042118} }