Intermittency in a stochastic birth-death model

Zanette, Damián; Mikhailov, Alexander S.

doi:10.1103/PhysRevE.50.1638

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Intermittency in a stochastic birth-death model

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Mikhailov, Alexander S.
Physical Chemistry, Fritz Haber Institute, Max Planck Society;
N. N. Semenov Institute for Chemical Physics, Russian Academy of Sciences;

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Zanette, D., & Mikhailov, A. S. (1994). Intermittency in a stochastic birth-death model. Physical Review E, 50(2), 1638-1641. doi:10.1103/PhysRevE.50.1638.

Cite as: https://hdl.handle.net/21.11116/0000-0009-A5E6-9

Abstract

A stochastic model of a population of particles that reproduce, die, and randomly walk over the lattice is numerically investigated. Simulations show that the spatial population distributions produced by this system are intermittent. The statistical cluster analysis of the data indicates similarity with the intermittency found in the hydrodynamic turbulence.