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Time series analysis and simultaneous equation econometric models. (English) Zbl 0282.90011

MSC:
91B84 Economic time series analysis
91B60 Trade models
62P20 Applications of statistics to economics
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[1] Akaike, H., Maximum likelihood identification of Gaussian autoregressive-moving average models, Biometrika, 60, 255-265, (1973) · Zbl 0318.62075
[2] Bartlett, M.S., On the theoretical specification of the sampling properties of autocorrelated time series, J. royal stat. soc. B, 8, 27-41, (1946) · Zbl 0063.00228
[3] Box, G.E.P.; Jenkins, G.M., Time series analysis, forecasting and control, (1970), Holden-Day San Francisco · Zbl 0109.37303
[4] Byron, R.P., (), 19, manuscript
[5] Chetty, V.K., Bayesian analysis of some simultaneous equation models and specification errors, Doctoral dissertation, (1966), University of Wisconsin Madison, unpublished
[6] Chetty, V.K., Bayesian analysis of Haavelmo’s models, Econometrica, 36, 582-602, (1968) · Zbl 0167.18505
[7] Dhrymes, P.J., Econometrics, statistical foundations and applications, (1970), Harper and Row New York
[8] Haavelmo, T., Methods of measuring the marginal propensity to consume, (), Studies in econometric methods, 105-122, (1953), Wiley New York · Zbl 0029.15806
[9] Hannan, E.J., The identification of vector mixed auto-regressive-moving average systems, Biometrika, 57, 223-225, (1969) · Zbl 0177.22502
[10] Hannan, E.J., The identification problem for multiple equation systems with moving average errors, Econometrica, 39, 715-765, (1971) · Zbl 0241.62049
[11] Jeffreys, H., Theory of probability, (1961), The Clarendon Press Oxford · Zbl 0116.34904
[12] Jorgenson, D.W., Rational distributed lag functions, Econometrica, 34, 135-149, (1966) · Zbl 0143.21904
[13] Kmenta, J., Elements of econometrics, (1971), MacMillan New York · Zbl 0272.62001
[14] Lindley, D.V., The use of prior probability distributions in statistical inference and decision, (), 453-468
[15] Marschak, J.; Koopmans, T.C., Statistical inference in economics, an introduction, Statistical inference in dynamic economic models, (1950), Wiley New York
[16] Nelson, C.R., (), 41, manuscript
[17] Palm, F., On mixed prior distributions and their application in distributed lag models, CORE discussion paper 7222, (1972), University of Louvain
[18] Pierce, D.A.; Mason, J.M., On estimating the fundamental dynamic equations of structural econometric models, Winter meeting of the econometric society, (1971), (New Orleans)
[19] Quenouille, M.H., The analysis of multiple time series, (1957), C. Griffin and Co London · Zbl 0077.33603
[20] Silvey, S.D., Statistical inference, (1970), Penguin Books Baltimore · Zbl 0207.49001
[21] Theil, H.; Boot, J.C.D., The final form of econometric equation systems, (), 136-152 · Zbl 0111.16903
[22] Tinbergen, J., Econometric business cycle research, Review of economic studies, 7, 73-90, (1940)
[23] Wold, H., Demand analysis: A study in econometrics, (1953), Wiley New York · Zbl 0050.36802
[24] Zellner, A., Review of ‘the analysis of multiple time-series’ by M.H. quenouille, J. of farm economics, 41, 682-684, (1959)
[25] Zellner, A., An introduction to Bayesian inference in econometrics, (1971), Wiley New York · Zbl 0246.62098
[26] Haugh, L.D., The identification of time series interrelationships with special reference to dynamic regression models, (1972), Department of Statistics, University of Wisconsin Madison, Sources of data
[27] United States Department of Commerce/Office of Business Economics, The national income and product accounts of the united states, 1929-1965, Statistical tables, (1966), (Washington, D.C.)
[28] United States Department of Commerce/Office of Business Economics, Survey of Current Business (Washington, D.C.).
[29] United States Department of Commerce/Office of Business Economics, Survey of Current Business (Washington, D.C.).
[30] U.S. Bureau of the Census, Current Population Reports: Population estimates, Series P-25 (Washington, D.C.).
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