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Stochastic Expansions and Asymptotic Approximations

Published online by Cambridge University Press:  18 October 2010

Michael A. Magdalinos
Michael A. Magdalinos
Affiliation:
Athens University of Economics and Business
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Abstract

Under general conditions the distribution function of the first few terms in a stochastic expansion of an econometric estimator or test statistic provides an asymptotic approximation to the distribution function of the original estimator or test statistic with an error of order less than that of the limiting normal or chi-square approximation. This can be used to establish the validity of several refined asymptotic methods, including the comparison of Nagar-type moments and the use of formal Edgeworth or Edgeworth-type approximations.

Type
Articles
Information
Econometric Theory , Volume 8 , Issue 3 , September 1992 , pp. 343 - 367
Copyright
Copyright © Cambridge University Press 1992

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References

REFERENCES

1.Amemiya, T. On the use of principal components of independent variables in two-stage leastsquares estimation. International Economic Review 7 (1966): 283303.CrossRefGoogle Scholar
2.Anderson, T.W. An asymptotic expansion of the distribution of the LIML estimate of a coefficient in a simultaneous equation system. Journal of the American Statistical Association 69 (1974): 565573.CrossRefGoogle Scholar
3. Anderson, T.W, Kunimoto, N. & Morimune, K.. Comparing single equation estimators in a simultaneous equation system. Econometric Theory 2 (1986): 132.CrossRefGoogle Scholar
4.Basmann, R.L. A note on the exact finite frequency function of generalized classical linear estimators in two leading overidentified cases. Journal of the American Statistical Association 56 (1961): 619636.CrossRefGoogle Scholar
5.Bhattacharya, R.N. Some recent results on Cramer-Edgeworth expansions with applications. In Krishnaiah, P.R. (ed.), Mulativariate Analysis-IV, Chapter 4 and pp. 5775. New York: Elsevier, 1985.Google Scholar
6.Bhattacharya, R.N. & Ghosh, J.K.. On the validity of the formal Edgeworth expansion. Annals of Statistics 6 (1978): 434451.CrossRefGoogle Scholar
7.Bhattacharya, R.N. & Rao, R.R.. Normal Approximation and Asymptotic Expansions. New York: Wiley, 1976.Google Scholar
8.Billingsley, P. Convergence of Probability Measures. New York: Wiley, 1968.Google Scholar
9. Brown, G.F., Kadane, J.B. & Ramage, J.G.. The asymptotic bias and mean squared error of double k-class estimators when the disturbances are small. International Economic Review 15 (1974): 667679.CrossRefGoogle Scholar
10.Chandra, T.K. & Ghosh., J.K.Valid asymptotic expansions for the likelihood ratio statistic and other perturbed chi-square variables. Sankhya A41 (1979): 2247.Google Scholar
11.Chandra, T.K. & Ghosh, J.K.. Valid asymptotic expansions for the likelihood ratio and other statistics under contiguous alternatives. Sankhya A42 (1980): 170184.Google Scholar
12.Chibisov, D.M. On the normal approximation for a certain class of statistics. Proceedigns of the 6th Berkeley Symposium in Mathematical Statistics and Probability, Vol. I (1972): 153174.Google Scholar
13.Chibisov, D.M. An asymptotic expansion for the distribution of a statistic admitting an asymptotic expansion. Theory of Probability and its Applications 17 (1972): 620630.CrossRefGoogle Scholar
14.Chibisov, D.M. An asymptotic expansion for the distribution of a statistic admitting a stochastic expansion. I and II. Theory of Probability and its Applications 25 (1980): 732744 and 26 (1981): 1–12.CrossRefGoogle Scholar
15.Chibisov, D.M. An asymptotic expansion for a class of estimators containing maximum likelihood estimators. Theory of Probability and its Applications 18 (1983): 295303.CrossRefGoogle Scholar
16.Durbin, J. Approximations for densities of sufficient estimators. Biometrica 67 (1980): 311333.CrossRefGoogle Scholar
17.Feller, W. An Introduction to Probability Theory and Its Applications, Vol. II. New York: Wiley, 1971.Google Scholar
18. Fujikoshi, Y., Morimune, K., Kunimoto, N. & Taniguchi, M.. Asymptotic expansions of the distributions of the estimates of coefficients in a simultaneous equation system. Journal of Econometrics 18 (1982): 191205.CrossRefGoogle Scholar
19.Götze, F. & Hipp., C.Asymptotic expansions in the central limit theorem under moment conditions. Z. Wahrscheinlichkeitstheorie verw. Gebiete 42 (1978): 6787.CrossRefGoogle Scholar
20.Götze, F. & Hipp., C.Asymptotic expansions for sums of weakly dependent random vectors. Z. Wahrscheinlichkeitstheorie verw. Gebiete 64 (1983): 211239.CrossRefGoogle Scholar
21.Hatanaka, M.On the existence and approximation formulae for the moments of A:-class estimators. Economic Studies Quarterly 24 (1973): 115.Google Scholar
22.Kadane, J.B.Comparison of the Ar-class estimators when the disturbances are small. Econometrica 39 (1971): 723737.CrossRefGoogle Scholar
23.Kariya, T. & Maekawa, K.. A method for approximations to the pdfs and cdfs of GLSE's and its applications to the seemingly unrelated regression model. Annals of the Institute of Statistical Mathematics 34 (1982): 281297.CrossRefGoogle Scholar
24.Magdalinos, M.A.The classical principles of testing using instrumental variables estimates. Journal of Econometrics 44 (1990): 241279.CrossRefGoogle Scholar
25.Magee, L.Efficiency of iterative estimators in the regression model with AR(1) disturbances. Journal of Econometrics 29 (1985): 275287.CrossRefGoogle Scholar
26.Morimune, K. & Tsukuda, Y.. Testing a subset of coefficients in a structural equation. Econometrica 52 (1984): 427448.CrossRefGoogle Scholar
27.Nagar, A.L.The bias and moment matrix of the general A:-class estimator of the parameters in structural equations. Econometrica 27 (1959): 575595.CrossRefGoogle Scholar
28.Ortega, J.M. & Rheinboldt, W.C.Iterative Solution of Nonlinear Equations in Several Variables. New York: Academic Press, 1970.Google Scholar
29.Pfanzagl, J. Asymptotic expansions in parametric statistical theory. In Krishnaiah, P.R. (ed.), Developments in Statistics, Chapter 1 and pp. 190. New York: Academic Press, 1980.Google Scholar
30.Pfanzagl, J. & Wefelmeyer, W.. A third order optimum property of the maximum likelihood estimator. Journal of Multivariate Analysis 8 (1978): 127.CrossRefGoogle Scholar
31.Phillips, P.C.B.A general theorem in the theory of asymptotic expansions as approximations to the finite sample distributions of econometric estimators. Econometrica 45 (1977): 15171534.CrossRefGoogle Scholar
32.Phillips, P.C.B.Edgeworth and saddlepoint approximations in the first order non circular autoregression. Biometrica 65 (1978): 9198.CrossRefGoogle Scholar
33.Phillips, P.C.B. ERA's: A new approach to small sample theory. Econometrica 51 (1983): 15051525.CrossRefGoogle Scholar
34.Phillips, P.C.B. & Park, J.Y.. On the formulation of Wald tests of nonlinear restrictions. Econometrica 56 (1988): 10561083.CrossRefGoogle Scholar
35.Rao, C.R.Linear Statistical Inference and Its Applications. New York: Wiley, 1973.CrossRefGoogle Scholar
36.Rothenberg, T.J.Approximate normality of generalized least squares estimates. Econometrica 52 (1984): 811825.CrossRefGoogle Scholar
37.Rothenberg, T.J.Hypothesis testing in linear models when the error covariance matrix is nonscalar. Econometrica 52 (1984): 827842.CrossRefGoogle Scholar
38.Rothenberg, T.J.Approximate power functions for some robust tests of regression coefficients. Econometrica 56 (1988): 9971019.CrossRefGoogle Scholar
39.Sargan, J.D.Econometric estimators and the Edgeworth approximation. Econometrica 44 (1976): 825840.CrossRefGoogle Scholar
40.Sargan, J.D.Some approximations to the distributions of econometric criteria which are asymptotically distributed as chi-squared. Econometrica 48 (1980): 11081138.CrossRefGoogle Scholar
41.Sargan, J.D. & Mikhail, W.M.. A general approximation to the distribution of instrumental variables estimates. Econometrica 39 (1971): 131169.CrossRefGoogle Scholar
42.Sargan, J.D. & Satchell, S.E.. A theorem for the validity of Edgeworth expansions. Econometrica 54 (1976): 189213.CrossRefGoogle Scholar
43.Skovgaard, I.M.Edgeworth expansions of the distributions of maximum likelihood estimators in the general (non i.i.d.) case. Scandinavian Journal of Statistics 8 (1981): 227236.Google Scholar
44.Skovgaard, I.M.On multivariate Edgeworth expansions. International Statistical Review 54 (1986): 169186.CrossRefGoogle Scholar
45.Srinivasan, T.N.Approximations to finite sample moments of estimators whose exact sampling moments are unknown. Econometrica 38 (1970): 533541.CrossRefGoogle Scholar
46.Takeuchi, K. & Morimune, K.. Third-order efficiency of the extended maximum likelihood estimators in a simultaneous equation system. Econometrica 58 (1985): 177200.CrossRefGoogle Scholar