On the inverses of some patterned matrices arising in the theory of stationary time series

R. F. Galbraith; J. I. Galbraith

doi:10.2307/3212583

Abstract

Expressions are obtained for the determinant and inverse of the covariance matrix of a set of n consecutive observations on a mixed autoregressive moving average process. Explicit formulae for the inverse of this matrix are given for the general autoregressive process of order p (n ≧ p), and for the first order mixed autoregressive moving average process.

References

Box, G. E. P. and Jenkins, G. I. (1970) Time Series Analysis Forecasting and Control. Holden Day, San Francisco.Google Scholar

Shaman, P. (1969) On the inverse of the covariance matrix of a first order moving average Biometrika 56, 595–600.Google Scholar

Siddiqui, M. M. (1958) On the inversion of the sample covariance matrix in a stationary autoregressive process Ann. Math. Statist. 29, 585–588.Google Scholar

Walker, A. M. (1962) Large sample estimation of parameters for autoregressive processes with moving average residuals Biometrika 49, 117–131.Google Scholar

Whittle, P. (1951) Hypothesis Testing in Time-Series Analysis. Almqvist and Wiksell, Upsala.Google Scholar

Wise, J. (1955) The autocorrelation function and the spectral density function Biometrika 42, 151–159.CrossRef Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Anderson, O. D. 1976. AN IMPROVED APPROACH TO INVERTING THE AUTOCOVARIANCE MATRIX OF A GENERAL MIXED AUTOREGRESSIVE MOVING AVERAGE TIME PROCESS1. Australian Journal of Statistics, Vol. 18, Issue. 1-2, p. 73.

Plosser, Charles I. and Schwert, G.William 1977. Estimation of a non-invertible moving average process. Journal of Econometrics, Vol. 6, Issue. 2, p. 199.

Bhansali, R. J. 1977. Asymptotic Properties of the Wiener–Kolmogorov Predictor. Ii. Journal of the Royal Statistical Society Series B: Statistical Methodology, Vol. 39, Issue. 1, p. 66.

Gooijer, J. G. 1978. On the inverse of the autocovariance matrix for a general mixed autoregressive moving average process. Statistische Hefte, Vol. 19, Issue. 2, p. 114.

1979. Analysis of Economic Time Series. p. 437.

Jones, Richard H. 1980. Maximum Likelihood Fitting of ARMA Models to Time Series With Missing Observations. Technometrics, Vol. 22, Issue. 3, p. 389.

Hietikko, Harri 1981. On the numerical behaviour of ARMA(P,Q) covariance determinants for various sample sizes. Communications in Statistics - Simulation and Computation, Vol. 10, Issue. 5, p. 451.

Booth, N.B. and Smith, A.F.M. 1982. A Bayesian approach to retrospective identification of change-points. Journal of Econometrics, Vol. 19, Issue. 1, p. 7.

Dickinson, Bradley W. 1982. SUFFICIENT STATISTICS FOR STATIONARY DISCRETE‐TIME GAUSSIAN RANDOM PROCESSES. Journal of Time Series Analysis, Vol. 3, Issue. 3, p. 165.

DZHAPARIDZE, K.O. and YAGLOM, A.M. 1983. Vol. 4, Issue. , p. 1.

CrossRef

Kunitomo, Naoto and Yamamoto, Taku 1985. Properties of Predictors in Misspecified Autoregressive Time Series Models. Journal of the American Statistical Association, Vol. 80, Issue. 392, p. 941.

Taniguchi, Masanobu 1986. Third order asymptotic properties of maximum likelihood estimators for Gaussian ARMA processes. Journal of Multivariate Analysis, Vol. 18, Issue. 1, p. 1.

Dugré, Jean-Pierre Scharf, Louis L and Gueguen, Claude 1986. Exact likelihood for stationary vector autoregressive moving average processes. Signal Processing, Vol. 11, Issue. 2, p. 105.

Canarella, G. and Pollard, S. K. 1987. Test of the efficiency of commodity futures in a multi-contract framework. Empirical Economics, Vol. 12, Issue. 2, p. 67.

Hall, Peter 1987. On the amount of detail that can be recovered from a degraded signal. Advances in Applied Probability, Vol. 19, Issue. 02, p. 371.

Schimek, M. G. 1988. Compstat. p. 37.

Bellhouse, D.R. 1989. Optimal estimation of linear functions of finite population means in rotation sampling. Journal of Statistical Planning and Inference, Vol. 21, Issue. 1, p. 69.

Bhansali, R. J. 1989. ESTIMATION OF THE MOVING‐AVERAGE REPRESENTATION OF A STATIONARY PROCESS BY AUTOREGRESSIVE MODEL FITTING. Journal of Time Series Analysis, Vol. 10, Issue. 3, p. 215.

Bhansali, R. J. 1990. On a relationship between the inverse of a stationary covariance matrix and the linear interpolator. Journal of Applied Probability, Vol. 27, Issue. 01, p. 156.

Eltinge, John L. 1992. Exponential Convergence Properties of Autocovariance Matrix Inverses and Latent Vector Prediction Coefficients. SIAM Journal on Matrix Analysis and Applications, Vol. 13, Issue. 4, p. 1067.

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On the inverses of some patterned matrices arising in the theory of stationary time series

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On the inverses of some patterned matrices arising in the theory of stationary time series

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