REFERENCES
- Ansley, C., and Kohn, R. (1985), “Estimation, Filtering, and Smoothing in State Space Models With Incompletely Specified Initial Conditions,” The Annals of Statistics, 13, 1286–1316.
- Axelsson, O. (1996), Iterative Solution Methods, Cambridge, UK: Cambridge University Press.
- Bell, W. (1984), “Signal Extraction for Nonstationary Time Series,” The Annals of Statistics, 12, 646–664.
- Bell, W., and Hillmer, S. (1991), “Initializing the Kalman Filter for Nonstationary Time Series Models,” Journal of Time Series Analysis, 12, 283–300.
- Bloomfield, P. (1973), “An Exponential Model for the Spectrum of a Scalar Time Series,” Biometrika, 60, 217–226.
- Box, G., and Jenkins, G. (1976), Time Series Analysis, San Francisco, CA: Holden-Day.
- Brockwell, P., and Davis, R. (1991), Time Series: Theory and Methods, New York: Springer.
- Chan, N.H., and Palma, W. (1998), “State Space Modeling of Long-Memory Processes,” The Annals of Statistics, 26, 719–740.
- Chen, B., and Zadrozny, P. (1998), “An Extended Yule-Walker Method for Estimating a Vector Autoregressive Model With Mixed-Frequency Data,” Advances in Econometrics, 13, 47–73.
- Cochran, W. (1934), “The Distribution of Quadratic Forms in a Normal System, With Applications to the Analysis of Covariance,” Proceedings of Cambridge Philosophical Society, 30, 178–191.
- Dagum, E. (1980), The X-11-ARIMA Seasonal Adjustment Method, Ottawa: Statistics Canada.
- Doornik, J. (1998), Object-Oriented Matrix Programming Using Ox 2.0, London: Timberlake Consultants Press.
- Durbin, J., and Koopman, S. (2001), Time Series Analysis by State Space Methods, Oxford, UK: Oxford University Press.
- Durbin, J., and Quenneville, B. (1997), “Benchmarking by State Space Methods,” International Statistical Review, 65, 23–48.
- Golub, G., and Van Loan, C. (1996), Matrix Computations, Baltimore and London: The Johns Hopkins University Press.
- Hillmer, S., and Tiao, G. (1982), “An ARIMA-Model-Based Approach to Seasonal Adjustment,” Journal of the American Statistical Association, 77, 63–70.
- Holan, S., McElroy, T., and Chakraborty, S. (2009), “A Bayesian Approach to Estimating the Long Memory Parameter,” Bayesian Analysis, 4, 159–190.
- Koopman, S., Shephard, N., and Doornik, J. (1999), “Statistical Algorithms for Models in State Space Using SsfPack 2.2,” Econometrics Journal, 2, 113–166.
- Ladiray, D., and Quenneville, B. (2001), Seasonal Adjustment With the X-11 Method (Vol. 158), New York: Springer-Verlag.
- Maravall, A., and Caparello, G. (2004), Program TSW: Revised Reference Manual. Working Paper 2004, Research Department, Bank of Spain. Available at http://www.bde.es.
- McElroy, T. (2008), “Matrix Formulas for Nonstationary ARIMA Signal Extraction,” Econometric Theory, 24, 1–22.
- McElroy, T., and Holan, S. (2009), “Using Spectral Peaks to Detect Seasonality,” 2009 Proceedings of the Federal Conference on Statistical Methodology.
- McElroy, T., and Holan, S. (2012), “On the Estimation of Autocovariances for Generalized Gegenbauer Processes,” Statistica Sinica, 22, 1661–1687.
- McElroy, T., and Politis, D. (2014), “Spectral Density and Spectral Distribution Inference for Long Memory Time Series via Fixed-b Asymptotics,” Journal of Econometrics, 182, 211–225.
- Parzen, E. (1961), “An Approach to Time Series Analysis,” The Annals of Mathematical Statistics, 32, 951–989.
- Pasteels, J.-M. (2012), “Seasonal Adjustment of Data Derived From Labour Force Surveys: Some Specific Issues,” 2012 Workshop on Methodological Issues in Seasonal Adjustment, Luxembourg. Available at http://www.cros-portal.eu/page/2012-workshop-methodological-issues-seasonal-adjustment
- R Development Core Team (2014), R: A Language and Environment for Statistical Computing. Vienna, Austria: R Foundation for Statistical Computing. Available at http://www.R-project.org/.
- Scheffé, H. (1959), The Analysis of Variance, New York: Wiley.
- Soukup, R., and Findley, D. (1999), “On the Spectrum Diagnostics Used by X-12-ARIMA to Indicate the Presence of Trading Day Effects After Modeling or Adjustment,” Proceedings of the Business and Economic Statistics Section, American Statistical Association, pp. 144–149.
- U. S. Census Bureau. (2011), “X-12-ARIMA Reference Manual,” available at http://www.census.gov/ts/x12a/v03/x12adocV03.pdf
- Zadrozny, P. (1990), “Estimating a Multivariate ARMA Model With Mixed-Frequency Data: An Application to Forecasting U.S. GNP at Monthly Intervals,” Research Paper, Research Department, Federal Reserve Bank of Atlanta, pp. 90–96.