Advances and Applications in Statistics

The Advances and Applications in Statistics is an internationally recognized journal indexed in the Emerging Sources Citation Index (ESCI). It provides a platform for original research papers and survey articles in all areas of statistics, both computational and experimental in nature.

Submit Article

PARTIALLY LINEAR VARYING-COEFFICIENT AUTOREGRESSIVE MODEL

Authors

  • Zhiqiang Cao
  • Hui Li

Keywords:

autoregressive model, linear regression, local linear, two-stage estimation, varying coefficient.

DOI:

https://doi.org/10.17654/0972361724011

Abstract

For complicated time series data, we study a kind of partially varying-coefficient autoregressive mixed model including the delay term of the dependent variable as part of covariates as well as some exogenous covariates. The proposed model includes several popular types of time series models as special cases and extends the functional coefficient autoregressive model and the classical regression and autoregressive mixed model. We propose a two-stage method to estimate the coefficients of the model, in which the first stage estimates all coefficients by the local linear method, and the second stage estimates constant coefficients using traditional ordinary least squares (OLS). Consistency and asymptotic normality of both the local linear estimators and two stage estimators are established under regularity conditions. Simulation studies are conducted to empirically examine the finite sample performance of the proposed method, and a real data example about Lake Shasta inflow is used to illustrate the application of the proposed model.

Received: September 11, 2023
Accepted: December 13, 2023

References

B. A. Brumback and J. A. Rice, Smoothing spline models for the analysis of nested and crossed samples of curves, J. Amer. Stat. Assoc. 93(443) (1998), 961-976.

Z. Cai, Trending time-varying coefficient time series models with serially correlated errors, J. Econometrics 136(1) (2007), 163-188.

Z. Cai, L. Chen and Y. Fang, Semiparametric estimation of partially varying-coefficient dynamic panel data models, Economet. Rev. 34(6-10) (2015), 694-718.

Z. Cai, J. Fan and Q. Yao, Functional-coefficients regression models for nonlinear time series, J. Amer. Stat. Assoc. 95(451) (2000), 941-956.

Z. Cai, Y. Fang and D. Tian, Assessing tail risk using expectile regressions with partially varying coefficients, Journal of Management Science and Engineering 3(4) (2018), 183-213.

X. B. Chen, J. Gao, D. Li and P. Silvapulle, Nonparametric estimation and forecasting for time-varying coefficient realized volatility models, J. Bus. Econ. Stat. 36(1) (2018), 88-100.

R. Chen and L. M. Liu, Functional coefficient autoregressive models: estimation and tests of hypotheses, J. Time Ser. Anal. 22(2) (2001), 151-173.

R. Chen and R. S. Tsay, Functional-coefficient autoregressive models, J. Amer. Stat. Assoc. 88(421) (1993), 298-308.

T. Cheng, J. Gao and X. Zhang, Bayesian bandwidth estimation in nonparametric time-varying coefficient models, J. Bus. Econ. Stat. 37(1) (2019), 1-12.

J. S. Cho, M. J. Greenwood-Nimmo and Y. Shin, Testing for the Threshold Autoregressive Distributed Lag Model, University of York, Mimeo, 2020a.

J. S. Cho, M. J. Greenwood-Nimmo and Y. Shin, The Threshold Autoregressive Distributed Lag Model, University of York, Mimeo, 2020b.

J. S. Cho, M. Greenwood-Nimmo and Y. Shin, Recent developments of the autoregressive distributed lag modelling framework, J. Econ. Surv. 37(1) (2023), 7-32.

J. C. Cuaresma, G. Doppelhofer, M. Feldkircher and F. Huber, Spillovers from US monetary policy: evidence from a time varying parameter global vector autoregressive model, J. R. Stat. Soc. A Stat. 182(3) (2019), 831-861.

C. De Boor, A Practical Guide to Splines, Springer-Verlag, New York, 2001.

G. L. Fan, H. Y. Liang and J. F. Wang, Statistical inference for partially time-varying coefficient errors-in-variables models, J. Stat. Plan. Infer. 143(3) (2013), 505-519.

J. Fan and I. Gijbels, Local Polynomial Modelling and its Applications, Chapman and Hall, London, 1996.

Y. Grenier, Time-dependent ARMA modeling of nonstationary signals, IEEE Trans. Acoustics, Speech and Signal Processing 31(4) (1983), 899-911.

D. N. Gujarati and D. C. Porter, Essentials of Econometrics, 4th ed, McGraw-Hill/Irwin, New York, 2010.

V. Haggan and T. Ozaki, Modelling nonlinear random vibrations using an amplitude-dependent autoregressive time series model, Biometrika 68(1) (1981), 189-196.

T. Hastie and R. Tibshirani, Varying-coefficient models, J. R. Stat. Soc. B 55(4) (1993), 757-796.

D. F. Hendry, A. R. Pagan and J. D. Sargan, Dynamic specification, Z. Griliches and M. D. Intriligator, eds., Handbook of Econometrics, Vol. II, Elsevier, Amsterdam, 1984, pp. 1023-1100.

L. Hu, T. Huang and J. You, Two-step estimation of time-varying additive model for locally stationary time series, Comput. Stat. Data Anal. 130 (2019), 94-110.

J. Z. Huang and H. P. Shen, Functional coefficient regression models for non-linear time series: a polynomial spline approach, Scand. J. Stat. 31(4) (2004), 515-534.

J. Jiang, Multivariate functional-coefficient regression models for nonlinear vector time series data, Biometrika 101(3) (2014), 689-702.

S. Karmakar, S. Richter and W. B. Wu, Simultaneous inference for time-varying models, J. Econometrics 227(2) (2022), 408-428.

S. Kim, Z. Zhao and Z. Xiao, Efficient estimation for time-varying coefficient longitudinal models, J. Nonparametr. Stat. 30(3) (2018), 680-702.

D. Li, J. Chen and Z. Lin, Statistical inference in partially time-varying coefficient models, J. Stat. Plan. Infer. 141(2) (2011), 995-1013.

D. Li, P. C. B. Phillips and J. Gao, Kernel-based inference in time-varying coefficient cointegrating regression, J. Econometrics 215(2) (2020), 607-632.

X. Liu, Z. Cai and R. Chen, Functional coefficient seasonal time series models with an application of Hawaii tourism data, Comput. Stat. 30 (2015), 719-744.

D. F. Nicholls and B. G. Quinn, Random Coefficient Autoregressive Models: An Introduction (Lecture Notes in Statistics II), Springer, New York, 1982.

A. Q. Philips, Have your cake and eat it too? Cointegration and dynamic inference from autoregressive distributed lag models, Am. J. Polit. Sci. 62(1) (2018), 230-244.

M. B. Priestley, State-dependent models: a general approach to non-linear time series analysis, J. Time Ser. Anal. 1(1) (1980), 47-71.

J. O. Ramsay and B. W. Silverman, Functional Data Analysis, Springer-Verlag, New York, 1997.

P. M. Robinson, Nonparametric estimation of time-varying parameters, Statistical Analysis and Forecasting of Economic Structural Change, P. Hackl, ed., Springer-Verlag, Berlin, 1989, pp. 253-264.

Y. Shin and M. Thornton, The spatio-temporal autoregressive distributed lag modelling approach to an analysis of the spatial heterogeneity and diffusion dependence, University of York, Mimeo, 2019.

Y. Shin, B. Yu and M. J. Greenwood-Nimmo, Modelling asymmetric cointegration and dynamic multipliers in a nonlinear ARDL framework, W. Horrace and R. Sickles, eds., Festschrift in Honor of Peter Schmidt: Econometric Methods and Applications, Springer Science and Business Media, New York, NY, 2014, pp. 281-314.

R. H. Shumway and D. Stoffer, Time Series Analysis and its Applications, 4th ed., Springer-Verlag, New York, 2017.

T. Subba Rao, The fitting of non-stationary time-series models with time-dependent parameters, J. R. Stat. Soc. B 32(2) (1970), 312-322.

L. Tian, D. Zucher and L. J. Wei, On the Cox model with time-varying regression coefficients, J. Amer. Stat. Assoc. 100(469) (2005), 172-183.

H. Tong, Threshold models in non-linear time series analysis, Lecture Notes in Statistics, Springer-Verlag, New York, 1983.

H. Tong, Nonlinear Time Series: A Dynamical System Approach, Oxford University Press, Oxford, 1990.

Y. Tu and Y. Wang, Functional coefficient cointegration models subject to time-varying volatility with an application to the purchasing power parity, Oxford Bull. Econ. Stat. 81(6) (2019), 1401-1423.

M. R. Wickens and T. S. Breusch, Dynamic specification, the long-run and the estimation of transformed regression models, The Economic Journal 98(390) (1988), 189-205.

K. Yousuf and S. Ng, Boosting high dimensional predictive regressions with time varying parameters, J. Econometrics 224(1) (2021), 60-87.

T. Zhang and W. B. Wu, Inference of time-varying regression models, Ann. Stat. 40(3) (2012), 1376-1402.

W. Zhang, S. Y. Lee and X. Song, Local polynomial fitting in semivarying coefficient model, J. Multivariate Anal. 82(1) (2002), 166-188.

Y. Zhou and H. Liang, Statistical inference for semiparametric varying-coefficient partially linear models with error-prone linear covariates, Ann. Stat. 37(1) (2009), 427-458.

Downloads

Published

02-01-2024

Issue

Vol. 91 No. 2 (2024)

Section

Articles

License

Copyright (c) 2024 Pushpa Publishing House, Prayagraj, India

Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

____________________________

Licensing Terms:

Attribution: Credit Pushpa Publishing House as the original publisher, including title and author(s) if applicable.

No Derivatives: Modifying or creating derivative works not allowed without written permission.

Contact Pushpa Publishing House for more info or permissions.

How to Cite

PARTIALLY LINEAR VARYING-COEFFICIENT AUTOREGRESSIVE MODEL. (2024). Advances and Applications in Statistics , 91(2), 141-173. https://doi.org/10.17654/0972361724011

Similar Articles

1-10 of 244

You may also start an advanced similarity search for this article.