Open AccessThreshold-asymmetric volatility models for integer-valued time series
Author(s) -
Deok Ryun Kim,
Jae Eun Yoon,
Sun Young Hwang
Publication year - 2019
Publication title -
communications for statistical applications and methods
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.326
H-Index - 6
eISSN - 2383-4757
pISSN - 2287-7843
DOI - 10.29220/csam.2019.26.3.295
Subject(s) - heteroscedasticity , mathematics , overdispersion , count data , autoregressive model , volatility (finance) , econometrics , poisson distribution , autoregressive conditional heteroskedasticity , negative binomial distribution , series (stratigraphy) , statistics , setar , time series , star model , autoregressive integrated moving average , paleontology , biology
This article deals with threshold-asymmetric volatility models for over-dispersed and zero-inflated time series of count data. We introduce various threshold integer-valued autoregressive conditional heteroscedasticity (ARCH) models as incorporating over-dispersion and zero-inflation via conditional Poisson and negative binomial distributions. EM-algorithm is used to estimate parameters. The cholera data from Kolkata in India from 2006 to 2011 is analyzed as a real application. In order to construct the threshold-variable, both local constant mean which is time-varying and grand mean are adopted. It is noted via a data application that threshold model as an asymmetric version is useful in modelling count time series volatility.
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