6533b852fe1ef96bd12aad4b
RESEARCH PRODUCT
Segmentation algorithm for non-stationary compound Poisson processes
J. Doyne FarmerBence TothFabrizio Lillosubject
Series (mathematics)GeneralizationEconophysicsProcess (computing)Nonparametric statisticsStochastic processes Statistics Financial markets EconophysicsStochastic processeFinancial marketCondensed Matter PhysicsPoisson distribution01 natural sciencesSignal010305 fluids & plasmasElectronic Optical and Magnetic Materialssymbols.namesake0103 physical sciencesCompound Poisson processsymbolsSegmentation010306 general physicsAlgorithmStatisticMathematicsdescription
We introduce an algorithm for the segmentation of a class of regime switching processes. The segmentation algorithm is a non parametric statistical method able to identify the regimes (patches) of a time series. The process is composed of consecutive patches of variable length. In each patch the process is described by a stationary compound Poisson process, i.e. a Poisson process where each count is associated with a fluctuating signal. The parameters of the process are different in each patch and therefore the time series is non-stationary. Our method is a generalization of the algorithm introduced by Bernaola-Galván, et al. [Phys. Rev. Lett. 87, 168105 (2001)]. We show that the new algorithm outperforms the original one for regime switching models of compound Poisson processes. As an application we use the algorithm to segment the time series of the inventory of market members of the London Stock Exchange and we observe that our method finds almost three times more patches than the original one. © 2010 EDP Sciences, Società Italiana di Fisica, Springer-Verlag.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2010-01-01 | The European Physical Journal B |