Abstract
The prediction and control of rare events is an important task in disciplines that range from physics and biology, to economics and social science. The Big Jump principle deals with a peculiar aspect of the mechanism that drives rare events. According to the principle, in heavy-tailed processes a rare huge fluctuation is caused by a single event and not by the usual coherent accumulation of small deviations. We consider generalized Lévy walks, a class of stochastic processes with power law distributed step durations and with complex microscopic dynamics in the single stretch. We derive the bulk of the probability distribution and using the big jump principle, the exact form of the tails that describes rare events. We show that the tails of the distribution present non-universal and non-analytic behaviors, which depend crucially on the dynamics of the single step. The big jump estimate also provides a physical explanation of the processes driving the rare events, opening new possibilities for their correct prediction.
Original language | English |
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Article number | 2732 |
Journal | Scientific Reports |
Volume | 10 |
Issue number | 1 |
DOIs | |
State | Published - 17 Feb 2020 |
Bibliographical note
Publisher Copyright:© 2020, The Author(s).
Funding
The support of Israel Science Foundation grant 1898/17 (E.B.) is acknowledged. R.B. thanks CSEIA (Center for Studies in European and International Affairs) of the University of Parma for the award granted to cover the costs of open-access publication.
Funders | Funder number |
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Israel Science Foundation | 1898/17 |