REFERENCES
- Amemiya , T. ( 1985 ). Advanced Econometrics . Oxford , UK : Blackwell .
- Berkes , I. , Horváth , L. , Kokoszka , P. ( 2003 ). GARCH processes: Structure and estimation . Bernoulli 9 ( 2 ): 201 – 227 .
- Brown , B. M. ( 1971 ). Martingale central limit theorems . Annals of Mathematical Statistics 42 : 59 – 66 .
- Chan , N. H. Peng , Peng , L. ( 2005 ). Weighted least absolute deviations estimation for an AR(1) process with ARCH(1) errors . Biometrika 92 : 477 – 484 .
- Cline , D. B. H. ( 2007 ). Stability of nonlinear stochastic recursions with application to nonlinear AR-GARCH models . Advances in Applied Probability 39 : 462 – 491 .
- Cline , D. B. H. , Pu , H. ( 2004 ). Stability and the Lyapounov exponent of threshold AR-ARCH models . Annals of Applied Probability 14 : 1920 – 1949 .
- Davis , R. A. , Mikosch , T. ( 1998 ). The sample autocorrelations of heavy-tailed processes with applications to ARCH' , The Annals of Statistics 26 : 2049 – 2080 .
- Doornik , J. A. ( 1998 ). Object-Oriented Matrix Programming Using Ox 2.0 , London : Timberlake Consultants Press .
- Engle , R. F. ( 1982 ). Autoregressive conditional heteroscedasticity with estimates of the variance of United Kingdom inflation . Econometrica 50 : 987 – 1007 .
- Feigin , P. D. , Tweedie , R. L. ( 1985 ). Random coefficient autoregressive processes. a Markov chain analysis of stationarity and finiteness of moments . Journal of Time Series Analysis 6 : 1 – 14 .
- Francq , C. , Zakoïan , J. ( 2004 ). Maximum likelihood estimation of pure GARCH and ARMA-GARCH processes . Bernoulli 10 ( 4 ): 605 – 637 .
- Francq , C. , Zakoïan , J. ( 2006 ). Mixing properties of a general class of GARCH(1,1) models without moment assumptions on the observed process . Econometric Theory 22 : 815 – 834 .
- Hansen , B. E. ( 1996 ). Inference when a nuisance parameter is not identified under the null hypothesis . Econometrica 64 : 413 – 430 .
- Hansen , B. E. ( 1997 ). Inference in TAR models . Studies in Nonlinear Dynamics and Econometrics 2 : 1 – 14 .
- Jensen , S. T. , Rahbek , A. ( 2004a ). Asymptotic inference for nonstationary GARCH . Econometric Theory 20 : 1203 – 1226 .
- Jensen , S. T. , Rahbek , A. ( 2004b ). Asymptotic normality of the QMLE estimator of ARCH in the nonstationary case . Econometrica 72 ( 2 ): 641 – 646 .
- Jensen , S. T. , Rahbek , A. ( 2007 ). On the law of large numbers for (geometrically) ergodic Markov chains . Econometric Theory 23 : 761 – 766 .
- Kristensen , D. ( 2005 ). Uniform erglodicity of a class of Markov chains with applications to time series models, Working paper, New York: Columbia University .
- Kristensen , D. , Rahbek , A. ( 2005 ). Asymptotics of the QMLE for a class of ARCH(q) models . Econometric Theory 21 : 946 – 961
- Lange , T. ( 2010 ). Tail behaviour and OLS estimation in AR–GARCH models. Statistica Sinica, forthcoming .
- Lanne , M. , Saikkonen , P. ( 2003 ). Modeling the U.S. short-term interest rate by mixture autoregressive processes . Journal of Financial Econometrics 1 : 96 – 125 .
- Lee , S. W. , Hansen , B. ( 1994 ). Asymptotic theory for the GARCH(1,1) quasi-maximum likelihood estimator . Econometric Theory 10 : 29 – 53 .
- Lehmann , E. L. ( 1999 ). Elements of Large-Sample Theory, New York: Springer-Verlag .
- Liebscher , E. ( 2005 ). Towards a unified approach for providing geometric ergodicity and mixing properties of nonlinear autoregressive processes . Journal of Time Series Analysis 26 : 669 – 689 .
- Ling , S. ( 2004 ). Estimation and testing stationarity for double-autoregressive models . Journal of the Royal Statistical Society: Series B 66 : 63 – 78 .
- Ling , S. ( 2007a ). A double AR(p) model: Structure and estimation . Statistica Sinica 17 : 161 – 175 .
- Ling , S. ( 2007b ). Self-weighted and local quasi-maximum likelihood estimators for ARMA-GARCH/IGARCH models . Journal of Econometrics 140 : 849 – 873 .
- Ling , S. , McAleer , M. ( 2003 ). Asymptotic theory for a vector ARMA-GARCH model . Econometric Theory 19 : 280 – 310 .
- Ling , S. , Li , W. K. ( 1998 ). Limiting distributions of maximum likelihood estimators for unstable ARMA models with GARCH errors . The Annals of Statistics 26 : 84 – 125 .
- Lu , Z. (1996). A note on geometric ergodicity of autoregressive conditional heteroscedasticity (ARCH) model. Statistics & Probability Letters 30:305–311.
- Lumsdaine , R. L. ( 1996 ). Consistency and asymptotic normality of the quasi-maximum likelihood estimator in IGARCH(1,1) and covariance stationary GARCH(1,1) models . Econometrica 64 : 575 – 596 .
- Medeiros , M. C. , Veiga , Á. ( 2004 ). Modeling multiple regimes in financial volatility with a flexible coefficient GARCH model, Technical report, Departamento de Economia, Pontifical Catholic University of Rio de Janeiro .
- Meitz , M. Saikkonen , P. ( 2006a ). Ergodicity, mixing, and existence of moments of a class of Markov models with applications to GARCH and ACD models, Working paper, Stockholm School of Economics & University of Helsinki .
- Meitz , M. , Saikkonen , P. ( 2006b ). Stability of nonlinear AR-GARCH models, Technical report, SSE/EFI Working Paper Series in Economics and Finance No. 632 .
- Meitz , M. , Saikkonen , P. ( 2008 ). Stability of nonlinear AR-GARCH models . Journal of Time Series Analysis 29 : 453 – 475 .
- Strumann , D. , Mikosch , T. ( 2006 ). ‘Quasi–maximum–likelihood estimation in heteroscedastic time series: A stochastic recurrence equations approach . Annals of Statistics 34 : 2449 – 2495 .
- Tjøstheim , D. ( 1990 ). Non-linear time series and Markov chains . Advances in Applied Probability 22 : 587 – 611 .
- Weiss , A. A. ( 1984 ). ARMA models with ARCH errors . Journal of Time Series Analysis 5 ( 2 ): 129 – 143 .
- Weiss , A. A. ( 1986 ). Asymptotic theory for ARCH models . Econometric Theory 2 : 107 – 131 .
- Wong , C. S. , Li , W. K. ( 2001 ). On a mixture autoregressive conditional heteroscedastic model . Journal of the American Statistical Association 96 : 982 – 995 .