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Abstract
Rare event statistics for random walks on complex networks are investigated using the large deviation formalism. Within this formalism, rare events are realised as typical events in a suitably deformed path-ensemble, and their statistics can be studied in terms of spectral properties of a deformed Markov transition matrix. We observe two different types of phase transition in such systems: (i) rare events which are singled out for sufficiently large values of the deformation parameter may correspond to localised modes of the deformed transition matrix; (ii) 'mode-switching transitions' may occur as the deformation parameter is varied. Details depend on the nature of the observable for which the rare event statistics is studied, as well as on the underlying graph ensemble. In the present paper we report results on rare events statistics for path averages of random walks in Erdös-Rényi and scale free networks. Large deviation rate functions and localisation properties are studied numerically. For observables of the type considered here, we also derive an analytical approximation for the Legendre transform of the large deviation rate function, which is valid in the large connectivity limit. It is found to agree well with simulations.
Original language | English |
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Article number | 184003 |
Number of pages | 12 |
Journal | Journal of Physics A |
Volume | 49 |
Issue number | 18 |
DOIs | |
Publication status | Published - 1 Apr 2016 |
Keywords
- complex networks
- large deviations
- random walks
- rare events
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Statistical approaches to Network Across Disciplines NETADIS
Sollich, P. (Primary Investigator)
1/01/2012 → 29/02/2016
Project: Research