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Gaussian likelihood-based inference for non-invertible MA(1) processes with SS noise

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  • Davis, Richard A.
  • Mikosch, Thomas

Abstract

A limit theory was developed in the papers of Davis and Dunsmuir (1996) and Davis et al. (1995) for the maximum likelihood estimator, based on a Gaussian likelihood, of the moving average parameter in an MA(1) model when is equal to or close to 1. Using the local parameterization, , where is the sample size, it was shown that the likelihood, as a function of , converged to a stochastic process. From this, the limit distributions of and ( is the maximum likelihood estimator and is the local maximizer of the likelihood closest to 1) were established. As a byproduct of the likelihood convergence, the limit distribution of the likelihood ratio test for testing vs. was also determined. In this paper, we again consider the limit behavior of the local maximizer closest to 1 of the Gaussian likelihood and the corresponding likelihood ratio statistic when the non-invertible MA(1) process is generated by symmetric -stable noise with . Estimates of a similar nature have been studied for causal-invertible ARMA processes generated by infinite variance stable noise. In those situations, the scale normalization improves from the traditional rate obtained in the finite variance case to . In the non-invertible setting of this paper, the rate is the same as in the finite variance case. That is, converges in distribution and the pile-up effect, i.e., , is slightly less than in the finite variance case. It is also of interest to note that the limit distributions of for different values of are remarkably similar.

Suggested Citation

  • Davis, Richard A. & Mikosch, Thomas, 1998. "Gaussian likelihood-based inference for non-invertible MA(1) processes with SS noise," Stochastic Processes and their Applications, Elsevier, vol. 77(1), pages 99-122, September.
    • Handle: RePEc:eee:spapps:v:77:y:1998:i:1:p:99-122
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    References listed on IDEAS

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    1. Tanaka, Katsuto & Satchell, S.E., 1989. "Asymptotic Properties of the Maximum-Likelihood and Nonlinear Least-Squares Estimators for Noninvertible Moving Average Models," Econometric Theory, Cambridge University Press, vol. 5(3), pages 333-353, December.
    2. Davis, Richard A. & Dunsmuir, William T.M., 1996. "Maximum Likelihood Estimation for MA(1) Processes with a Root on or near the Unit Circle," Econometric Theory, Cambridge University Press, vol. 12(1), pages 1-29, March.
    3. Davis, Richard A. & Knight, Keith & Liu, Jian, 1992. "M-estimation for autoregressions with infinite variance," Stochastic Processes and their Applications, Elsevier, vol. 40(1), pages 145-180, February.
    4. T. W. Anderson & Akimichi Takemura, 1986. "Why Do Noninvertible Estimated Moving Averages Occur?," Journal of Time Series Analysis, Wiley Blackwell, vol. 7(4), pages 235-254, July.
    5. Lii, Keh-Shin & Rosenblatt, Murray, 1992. "An approximate maximum likelihood estimation for non-Gaussian non-minimum phase moving average processes," Journal of Multivariate Analysis, Elsevier, vol. 43(2), pages 272-299, November.
    6. Davis, Richard A., 1996. "Gauss-Newton and M-estimation for ARMA processes with infinite variance," Stochastic Processes and their Applications, Elsevier, vol. 63(1), pages 75-95, October.
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    3. Maller, R. A., 2003. "Asymptotics of regressions with stationary and nonstationary residuals," Stochastic Processes and their Applications, Elsevier, vol. 105(1), pages 33-67, May.

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