Modeling Z-valued time series based on new versions of the Skellam INGARCH model

Recently, there has been a growing interest in integer-valued time series models, including integer-valued autoregressive (INAR) models and integer-valued generalized autoregressive conditional heteroscedastic (INGARCH) models, but only a few of them can deal with data on the full set of integers, i.e., Z = {...,−2,−1, 0, 1, 2, ...}. Although some attempts have been made to deal with Z-valued time series, these models do not provide enough flexibility in modeling some specific integers (e.g. 0, ±1). A symmetric Skellam INGARCH(1,1) model was proposed in the literature, but it only considered zero-mean processes, which limits its application. We first extend the symmetric Skellam INGARCH model to an asymmetric version, which can deal with non-zero-mean processes. Then we propose a modified Skellam model which adopts a careful treatment on integers 0 and ±1 to satisfy a special feature of the data. Our models are easy-to-use and flexible. The maximum likelihood method is used to estimate unknown parameters and the log-likelihood ratio test statistic is provided for testing the asymmetric model against the modified one. Simulation studies are given to evaluate performances of the parametric estimation and log-likelihood ratio test. A real data example is also presented to demonstrate good performances of newly proposed models.

[1]  A. Alzaid,et al.  On the Poisson difference distribution inference and applications. , 2010 .

[2]  Siem Jan Koopman,et al.  Intraday Stochastic Volatility in Discrete Price Changes: The Dynamic Skellam Model , 2017 .

[3]  Fukang Zhu A negative binomial integer‐valued GARCH model , 2010 .

[4]  Eric R. Ziegel,et al.  Time Series: Theory and Methods (2nd ed,) , 2012 .

[5]  Rodrigo B. Silva,et al.  Flexible and Robust Mixed Poisson INGARCH Models , 2019, Journal of Time Series Analysis.

[6]  Michael H. Neumann Absolute regularity and ergodicity of Poisson count processes , 2011, 1201.1071.

[7]  Dag Tjøstheim,et al.  On weak dependence conditions for Poisson autoregressions , 2012 .

[8]  M. Kachour,et al.  First‐order rounded integer‐valued autoregressive (RINAR(1)) process , 2009 .

[9]  Fukang Zhu,et al.  Inference for INAR(p) processes with signed generalized power series thinning operator , 2010 .

[10]  A. Milhøj The moment structure of ARCH processes , 1985 .

[11]  Thomas Guhr,et al.  Impact of the tick-size on financial returns and correlations , 2010, 1001.5124.

[12]  Refinement of a probability limit theorem and its application to Bessel functions , 1955 .

[13]  Jonas Andersson,et al.  A parametric time series model with covariates for integers in Z , 2014 .

[14]  Yousung Park,et al.  A non-stationary integer-valued autoregressive model , 2008 .

[15]  Richard A. Davis,et al.  Theory and inference for a class of nonlinear models with application to time series of counts , 2016 .

[16]  A. Alzaid,et al.  Poisson Difference Integer Valued Autoregressive Model of Order one , 2012 .

[17]  J. Strackee,et al.  The frequency distribution of the difference between two Poisson variates , 1962 .

[18]  M. Kachour,et al.  A p‐Order signed integer‐valued autoregressive (SINAR(p)) model , 2011 .

[19]  J. G. Skellam The frequency distribution of the difference between two Poisson variates belonging to different populations. , 1946, Journal of the Royal Statistical Society. Series A.

[20]  E. Gonçalves,et al.  Signed compound poisson integer-valued GARCH processes , 2020, Communications in Statistics - Theory and Methods.

[21]  Dag Tjøstheim,et al.  Count Time Series with Observation-Driven Autoregressive Parameter Dynamics , 2015 .

[22]  C. Weiß,et al.  An Introduction to Discrete-Valued Time Series , 2018 .

[23]  Konstantinos Fokianos,et al.  Estimation and testing linearity for non-linear mixed poisson autoregressions , 2015 .

[24]  Fukang Zhu Zero-inflated Poisson and negative binomial integer-valued GARCH models , 2012 .

[25]  Dag Tjøstheim,et al.  Poisson Autoregression , 2008 .

[26]  Marcelo Bourguignon,et al.  A skew INAR(1) process on Z , 2015 .

[27]  Miroslav M. Ristić,et al.  An INAR model with discrete Laplace marginal distributions , 2016 .

[28]  Xiaochun Liu,et al.  Unfolded GARCH models , 2015 .

[29]  T. Bollerslev,et al.  Generalized autoregressive conditional heteroskedasticity , 1986 .

[30]  Qi Li,et al.  Modeling time series of count with excess zeros and ones based on INAR(1) model with zero-and-one inflated Poisson innovations , 2019, J. Comput. Appl. Math..

[31]  Alain Latour,et al.  Integer‐Valued GARCH Process , 2006 .

[32]  Christophe Chesneau,et al.  A Parametric Study for the First-Order Signed Integer-Valued Autoregressive Process , 2012 .

[33]  Konstantinos Fokianos,et al.  QUASI‐LIKELIHOOD INFERENCE FOR NEGATIVE BINOMIAL TIME SERIES MODELS , 2014 .

[34]  R. Keith Freeland,et al.  True integer value time series , 2010 .

[35]  Fokianos Konstantinos Statistical Analysis of Count Time Series Models: A GLM Perspective , 2015 .

[36]  Dimitris Karlis,et al.  Bayesian modelling of football outcomes: using the Skellam's distribution for the goal difference , 2008 .