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Nonparametric Time-Series Estimation of Joint DGP, Conditional DGP, and Vector Autoregression

Published online by Cambridge University Press:  18 October 2010

Radhey S. Singh  and
Aman Ullah
Radhey S. Singh
Affiliation:
University of Guelph
Aman Ullah
Affiliation:
University of Western Ontario, London
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Abstract

In this paper we develop nonparametric estimators of the joint time series data generating process (DGP) of (xt, yt) at different t-values, of conditional DGP, of the conditional mean of xt given the past values of x and y, and, more generally, the conditional mean of (xt, yt) given their past values (vector autoregression). We establish, among other results, the central limit theorems for these estimators under far weaker mixing conditions than those used in Robinson [23], where only the xt series is considered. Uniform consistency and rate results for the consistencies of various estimators are also obtained. The results of the paper are useful in light of the fact that often the functional form of the dynamic regression is not known and also the assumption of the Gaussian process is not true.

Type
Research Article
Information
Econometric Theory , Volume 1 , Issue 1 , April 1985 , pp. 27 - 52
Copyright
Copyright © Cambridge University Press 1985 

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References

REFERENCES

1. Ahmad, I. A. (1979). Strong consistency of density estimation by orthogonal series methods for dependent variables with applications. Annals of the Institute of Statistical Mathematics, 31, 279288.Google Scholar
2. Baillie, R. T., Lippens, R. E., & McMahon, P. C. (1983). Testing rational expectations and efficiency in the foreign exchange market. Econometrica, 51, 513535.Google Scholar
3. Bierens, H. J. (1982). A uniform weak law of large numbers under 0-mixing, with application to nonlinear least squares estimation. Statistica Neerlandica, 36, 8186.Google Scholar
4. Bierens, H. J. (1983). Uniform consistency of kernel estimators of a regression function under generalized conditions. Journal of the American Statistical Association, 78, 699707.Google Scholar
5. Bierens, H. J. (1984). Model specification testing of time series regressions. Journal of Econometrics, 27 (forthcoming).Google Scholar
6. Billingsley, P. (1968). Convergence of Probability Measures. New York London: John Wiley.Google Scholar
7. Bradley, R. C. (1968). Central limit theorems under weak dependence. Journal of Multivariate Analysis, 10, 116.Google Scholar
8. Cacoullos, T. (1966). Estimation of a multivariate density. Annals of the Institute of Statistical Mathematics, 18, 179189.Google Scholar
9. Dvoretzky, A. (1972). Asymptotic normality for sums of dependent random variables. In Proceedings of the Sixth Berkeley Symposium on Mathematical Statistics and Probability. Berkeley: University of California Press, pp. 513535.Google Scholar
10. Epanechnikov, V. A. (1969). Nonparametric estimation of a multivariate probability density. Theory of Probability and Applications, 153158.Google Scholar
11. Hannan, E. J. (1970). Multiple Time Series. New York: Wiley.Google Scholar
12. Ibragimov, I. A. (1970). On the spectrum of stationary Gaussian processes satisfying the strong mixing condition II. Sufficient conditions. Mixing rate. Theory of Probability and Applications, 15, 2336.Google Scholar
13. Ibragimov, I. A., & Linnik, Yu. V. (1971). Independent and Stationary Sequences of Randoyn Variables. Groningen: Wolters-Noordhoff.Google Scholar
14. Jennrich, R. I. (1969). Asymptotic properties of nonlinear least squares estimates. Annals of Mathematical Statistics, 40, 633643.Google Scholar
15.Kronmal, R., & Tarter, M. (1968). The estimation of probability densities and cumulatives by Fourier series methods. Journal of the American Statistical Association, 38, 482493.Google Scholar
16. Levich, R. M. (1979). On the efficiency of markets for foreign exchange. In Dornbusch, R. and Frenkel, J. A. (eds.), International Economic Policy, Theory and Evidence. Baltimore, Md.: John Hopkins University Press.Google Scholar
17. Longworth, D. (1981). Testing the efficiency of the Canadian-U.S. exchange market under the assumption of no risk premium. Journal of Finance, 36, 4349.Google Scholar
18. McLeish, D. L. (1975). A maximal inequality and dependent strong laws. The Annals of Probability, 3, 829839.10.1214/aop/1176996269Google Scholar
19. Moore, D. S., & Yackel, J. W. (1977). Consistency properties of nearest neighbor density estimates. Annals of Statistics, 5, 143154.Google Scholar
20. Nadaraya, E. A. (1964). On estimating regression. Theory of Probability and Applications, 9, 141142.Google Scholar
21. Parzen, E. J. (1964). On estimation of a probability density and mode. Annals of Mathematical Statistics, 35, 10651076.Google Scholar
22. Pham, T. D., & Tran, L. T. (1980). The strong mixing property of the autoregressive moving average time series model. Seminaire de Statistique, Grenoble, 5976.Google Scholar
23. Robinson, P. M. (1983). Nonparametric estimators for time series. Journal of Time Series Analysis, 185208.Google Scholar
24. Rosenblatt, M. (1956). Remarks on some nonparametric estimates of a density function. Annals of Mathematical Statistics, 27, 832837.Google Scholar
25. Rosenblatt, M. (1956). A central limit theorem and a strong mixing condition. Proceedings of the National Academy of Science, USA, 42, 4347.Google Scholar
26. Rosenblatt, M. (1969). Conditional probability density and regression estimators. In Krishnaiah, P. R. (Ed.), Multivariate Analysis II. New York: Academic Press, pp. 2531.Google Scholar
27. Rosenblatt, M. (1970). Density estimates and Markov processes. In Puri, M. C. (Ed.), Nonparametric Techniques in Statistical Inference. Cambridge, England: Cambridge University Press, pp. 199210.Google Scholar
28. Roussas, G. (1967). Nonparametric estimation in Markov processes. Annals of the Institute of Statistical Mathematics, 21, 7387.Google Scholar
29. Roussas, G. (1969). Nonparametric estimation of the transition distribution function of a Markov process. Annals of Mathematical Statistics, 40, 13861400.Google Scholar
30. Schuster, E. F. (1972). Joint asymptotic distribution of the estimated regression function at a number of distinct points. Annals of Mathematical Statistics, 43, 8488.Google Scholar
31. Schwartz, S. C. (1967). Estimation of a probability density by an orthogonal series. Annals of Mathematical Statistics, 38, 12612165.Google Scholar
32. Singh, R. S. (1976). Nonparametric estimation of mixed partial derivatives of a multivariate density. Journal of Multivariate Analysis, 6, 555567.10.1016/0047-259X(76)90023-3Google Scholar
33. Singh, R. S. (1977). Applications of estimators of a density and its derivatives to certain statistical problems. Journal of the Royal Statistical Society, Series B, 39, 357363.Google Scholar
34. Singh, R. S. (1979). Mean squared errors of estimates of a density and its derivatives. Biometrika, 66, 177180.Google Scholar
35. Singh, R. S. (1981). Speed of convergence in nonparametric estimation of a multivariate jU-density and its mixed partial derivatives. Journal of Statistical Planning and Inference, 5, 287298.Google Scholar
36. Singh, R. S., & Ullah, A. (1984). Estimation of multivariate DGP. University of Western Ontario (manuscript).Google Scholar
37. Takahata, H. (1977). Limiting behavior of density estimates for stationary asymptotically uncorrelated processes. Bulletin of Tokyo Gakugei University, Series IV, 29, 19.Google Scholar
38. Takahata, H. (1980). Almost sure convergence of density estimators for weakly dependent stationary processes. Bulletin of Tokyo Gakugei University, Series IV, 32, 1132.Google Scholar
39. Ullah, A., & Singh, R. S. (1984). Estimation of density and its applications in econometrics. University of Western Ontario (manuscript).Google Scholar
40. Van Ryzin, J. (1973). On histogram method of density estimation. Communications in Statistics, 2, 493506.Google Scholar
41. Watson, G. S. (1964). Smooth regression analysis. Sankhya, Series A, 26 , 359372.Google Scholar
42. Watson, G. S. (1969). Density estimation by orthogonal series. Annals of Mathematical Statistics, 40, 14961498.Google Scholar
43. Wegman, E. J. (1970). Maximum likelihood estimation of a unimodal density function. Annals of Mathematical Statistics, 41, 457471.Google Scholar
44. White, H., & Domowitz, I. (1984). Nonlinear regression with dependent observations. Econometrica, 52, 143161.Google Scholar
45. Wolverton, C. T., & Wagner, T. J. (1969). Asymptotically optimal discriminant functions for pattern classification. IEEE Transaction of Information Theory, IT-15, 258265.Google Scholar
46. Yakowitz, S. (1979). Nonparametric estimation of Markov transition functions. Annals of Statistics, 7, 671679.Google Scholar
47. Yamato, H. (1971). Sequential estimation of a continuous probability density function and mode. Bulletin of Mathematical Statistics, 14, 112.Google Scholar