Multiplicative processes and power laws
Abstract
[Takayasu et al., Phys. Rev.Lett. 79, 966 (1997)] revisited the question of stochastic processes with multiplicative noise, which have been studied in several different contexts over the past decades. We focus on the regime, found for a generic set of control parameters, in which stochastic processes with multiplicative noise produce intermittency of a special kind, characterized by a power law probability density distribution. We briefly explain the physical mechanism leading to a power law pdf and provide a list of references for these results dating back from a quarter of century. We explain how the formulation in terms of the characteristic function developed by Takayasu et al. can be extended to exponents μ >2, which explains the ``reason of the lucky coincidence''. The multidimensional generalization of (eq1) and the available results are briefly summarized. The discovery of stretched exponential tails in the presence of the cut-off introduced in Taka is explained theoretically. We end by briefly listing applications.
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