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Hauptverfasser: Redondo, Paolo Victor T., Lansangan, Joseph Ryan G., Barrios, Erniel B.
Format: Preprint
Veröffentlicht: 2021
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2104.13520
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author Redondo, Paolo Victor T.
Lansangan, Joseph Ryan G.
Barrios, Erniel B.
author_facet Redondo, Paolo Victor T.
Lansangan, Joseph Ryan G.
Barrios, Erniel B.
contents A Poisson autoregressive (PAR) model accounting for discreteness and autocorrelation of count time series data is typically estimated in the state-space modelling framework through extended Kalman filter. However, because of the complex dependencies in count time series, estimation becomes more challenging. PAR is viewed as an additive model and estimated using a hybrid of cubic smoothing splines and maximum likelihood estimation (MLE) in the backfitting framework. Simulation studies show that this estimation method is comparable or better than PAR estimated in the state-space context, especially with larger count values. However, as [2] formulated PAR for stationary counts, both estimation procedures underestimate parameters in nearly nonstationary models. The flexibility of the additive model has two benefits though: robust estimation in the presence of temporary structural change, and; viability to integrate PAR model into a more complex model structure. We further generalized the PAR(p) model into multiple time series of counts and illustrated with indicators in the financial markets.
format Preprint
id arxiv_https___arxiv_org_abs_2104_13520
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Estimation of Poisson Autoregressive Model for Multiple Time Series
Redondo, Paolo Victor T.
Lansangan, Joseph Ryan G.
Barrios, Erniel B.
Methodology
Computation
A Poisson autoregressive (PAR) model accounting for discreteness and autocorrelation of count time series data is typically estimated in the state-space modelling framework through extended Kalman filter. However, because of the complex dependencies in count time series, estimation becomes more challenging. PAR is viewed as an additive model and estimated using a hybrid of cubic smoothing splines and maximum likelihood estimation (MLE) in the backfitting framework. Simulation studies show that this estimation method is comparable or better than PAR estimated in the state-space context, especially with larger count values. However, as [2] formulated PAR for stationary counts, both estimation procedures underestimate parameters in nearly nonstationary models. The flexibility of the additive model has two benefits though: robust estimation in the presence of temporary structural change, and; viability to integrate PAR model into a more complex model structure. We further generalized the PAR(p) model into multiple time series of counts and illustrated with indicators in the financial markets.
title Estimation of Poisson Autoregressive Model for Multiple Time Series
topic Methodology
Computation
url https://arxiv.org/abs/2104.13520