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A note on the time series which is the product of two stationary time series. (English) Zbl 0387.62074

62M10 Time series, auto-correlation, regression, etc. in statistics (GARCH)
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[1] A. Anderson and C.W.J. Granger, Introduction to bilinear time series models, Discussion Paper 76-5, Department of Economics, University of California, San Diego.
[2] Blackman, R.B.; Tukey, J.W., The measurement of power spectra, (1959), Dover Publications New York · Zbl 0084.21703
[3] Bohrnstedt, G.W.; Goldberger, A.S., On the exact covariance of products of random variables, J. amer. statist. assoc., 60, 1439-1442, (1965) · Zbl 0186.52403
[4] Goodman, L.A., On the exact variance of products, J. amer. statist. assoc., 55, 708-713, (1960) · Zbl 0099.13603
[5] Goodman, L.A., The variance of the product of K-random variables, J. amer. statist. assoc., 57, 54-60, (1962) · Zbl 0102.35505
[6] Granger, C.W.J.; Newbold, P., Forecasting transformed series, J. roy. statist. soc. B, 38, 2, 189-203, (1976) · Zbl 0344.62076
[7] Isserlis, L., On a formula for the product-moment coefficient of any order of a normal frequency distribution in any number of variables, Biometrika, 12, 134-139, (1918)
[8] Masani, P.; Wiener, N., Nonlinear prediction, () · Zbl 0080.13002
[9] Nelson, J.Z.; Van Ness, J.W., Formulation of a non-linear predictor, Technometrics, 15, 1, (1973)
[10] Parzen, E., On spectral analysis with missing observations and amplitude modulation, Sankhya ser. A, 25, 4, (1963) · Zbl 0136.40701
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