References
- Al-Osh, M. A., and A. A. Alzaid. 1987. First-order integer-valued autoregressive (INAR(1)) process. Journal of Time Series Analysis 8 (3):261–75. doi:10.1111/j.1467-9892.1987.tb00438.x.
- Awale, M., N. Balakrishna, and T. V. Ramanathan. 2017. Testing the constancy of the thinning parameter in a random coefficient integer autoregressive model. Statistical Papers 1–25. doi:10.1007/s00362-017-0884-x
- Barreto-Souza, W. 2015. Zero-modified geometric INAR(1) process for modelling count time series with deflation or inflation of zeros. Journal of Time Series Analysis 36 (6):839–52. doi:10.1111/jtsa.12131.
- Barreto-Souza, W. 2017. Mixed poisson INAR(1) processes. Statistical Papers 1–21. doi:10.1007/s00362-017-0912-x.
- Billingsley, P. 1961. Statistical Inference for Markov Processes. Chicago, IL: The University of Chicago Press.
- Franke, J., and T. Seligmann. 1993. Conditional maximum likelihood estimates for INAR(1) processes and their application to modeling eplieptic seizure counts. Developments in Time Series Analysis 310–30.
- Gomes, D., and L. C. e Castro. 2009. Generalized integer-valued random coefficient for a first order structure autoregressive (RCINAR) process. Journal of Statistical Planning and Inference 139 (12):4088–97. doi:10.1016/j.jspi.2009.05.037.
- Joe, H. 1996. Time series models with univariate margins in the convolution-closed infinitely divisible class. Journal of Applied Probability 33 (3):664–77. doi:10.2307/3215348.
- Jung, R. C., G. Ronning, and A. R. Tremayne. 2005. Estimation in conditional first order autoregression with discrete support. Statistical Papers 46 (2):195–224. doi: doi:10.1007/BF02762968.
- Kang, J., and S. Lee. 2009. Parameter change test for random coefficient integer-valued autoregressive processes with application to polio data analysis. Journal of Time Series Analysis 30 (2):239–58. doi:10.1111/j.1467-9892.2009.00608.x.
- Karlsen, H., and D. Tjøstheim. 1988. Consistent estimates for the near(2) and NLAR(2) time series models. Journal of the Royal Statistical Society. Series B 50 (2):313–20.
- Kim, H. Y., and Y. Park. 2008. A non-stationary integer-valued autoregressive model. Statistical Papers 49 (3):485–502. doi:10.1007/s00362-006-0028-1.
- Klimko, L. A., and P. I. Nelson. 1978. On conditional least squares estimation for stochastic processes. The Annals of Statistics 6 (3):629–42.
- Li, H., K. Yang, and D. Wang. 2017. Quasi-likelihood inference for self-exciting threshold integer-valued autoregressive processes. Computational Statistics 32 (4):1597–620. doi: doi:10.1007/s00180-017-0748-9.
- Li, H., K. Yang, S. Zhao, and D. Wang. 2017. First-order random coefficients integer-valued threshold autoregressive processes. AStA Advances in Statistical Analysis 102 (3):305–31. doi:10.1007/s10182-017-0306-3.
- Li, Q., and F. Zhu. 2017. Mean targeting estimator for the integer-valued GARCH(1,1) model. Statistical Papers 1–21. doi:10.1007/s00362-017-0958-9.
- McKenzie, E. 1985. Some simple models for discrete variate time series. Journal of the American Water Resources Association 21 (4):645–50. doi: doi:10.1111/j.1752-1688.1985.tb05379.x.
- McKenzie, E. 1986. Autoregressive moving-average process with negative-binomial and geometric marginal distribution. Advances in Applied Probability 18 (03):679–705. doi:10.2307/1427183.
- Monteiro, M.,. M. G. Scotto, and I. Pereira. 2012. Integer-valued self-exciting threshold autoregressive processes. Communications in Statistics-Theory and Methods 41 (15):2717–37. doi:10.1080/03610926.2011.556292.
- Pedeli, X., and D. Karlis. 2011. A bivariate INAR(1) process with application. Statistical Modelling: An International Journal 11 (4):325–49. doi:10.1177/1471082X1001100403.
- Ristić, M. M., H. S. Bakouch, and A. S. Nastić. 2009. A new geometric first-order integer-valued autoregressive (NGINAR(1)) process. Journal of Statistical Planning and Inference 139 (7):2218–26. doi:10.1016/j.jspi.2008.10.007.
- Ristić, M. M., A. S. Nastić, and H. S. Bakouch. 2012. Estimation in an integer-valued autoregressive process with negative binomial marginals (NBINAR(1)). Communications in Statistics-Theory and Methods 41 (4):606–18. doi:10.1080/03610926.2010.529528.
- Steutel, F. W., and K. Van Harn. 1979. Discrete analogues of self-decomposability and stability. The Annals of Probability 7 (5):893–9.
- Van der Vaart, A. W. 2000. Asymptotic Statistics (Cambridge Series in Statistical and Probabilistic Mathematics). Cambridge , UK: Cambridge University Press.
- Van Dijk, H. K., and T. Kloek. 1980. Further experience in bayesian analysis using monte carlo integration. Journal of Econometrics 14 (3):307–28. doi:10.1016/0304-4076(80)90030-5.
- Wang, D., and H. Zhang. 2010. Generalized RCINAR(p) process with signed thinning operator. Communications in Statistics—Simulation and Computation 40 (1):13–1770. doi:10.1080/03610918.2010.526739.
- Weiß, C. H. 2008. Thinning operations for modeling time series of counts-a survey. AStA Advances in Statistical Analysis 92 (3):319–41. doi:10.1007/s10182-008-0072-3.
- Weiß, C. H. 2008. Serial dependence and regression of poisson INARMA models. Journal of Statistical Planning and Inference 138 (10):2975–90. doi:10.1016/j.jspi.2007.11.009.
- Yang, K., D. Wang, B. Jia, and H. Li. 2016. An integer-valued threshold autoregressive process based on negative binomial thinning. Statistical Papers 1–30. doi:10.1007/s00362-016-0808-1.
- Yang, K., D. Wang, and H. Li. 2018. Threshold autoregression analysis for finiterange time series of counts with an application on measles data. Journal of Statistical Computation and Simulation 88 (3):597–614. doi:10.1080/00949655.2017.1400032.
- Yang, K., H. Li, and D. Wang. 2018. Estimation of parameters in the self-exciting threshold autoregressive processes for nonlinear time series of counts. Applied Mathematical Modelling 57:226–47. doi:10.1016/j.apm.2018.01.003.
- Zhang, H., D. Wang, and F. Zhu. 2010. Inference for INAR(p) processes with signed generalized power series thinning operator. Journal of Statistical Planning and Inference 140 (3):667–83. doi:10.1016/j.jspi.2009.08.012.
- Zhang, H., D. Wang, and F. Zhu. 2011. The empirical likelihood for first-order random coefficient integer-valued autoregressive processes. Communications in Statistics-Theory and Methods 40 (3):492–509. doi:10.1080/03610920903443997.
- Zhang, H., and D. Wang. 2015. Inference for random coefficient INAR(1) process based on frequency domain analysis. Communications in Statistics-Simulation and Computation 44 (4):1078–100. doi:10.1080/03610918.2013.804556.
- Zheng, H., I. V. Basawa, and S. Datta. 2007. First-order random coefficient integer-valued autoregressive process. Journal of Statistical Planning and Inference 137 (1):212–29. doi:10.1016/j.jspi.2005.12.003.