Demos, Antonis and Arvanitis, Stelios (2010): Stochastic Expansions and Moment Approximations for Three Indirect Estimators. Published in:
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Abstract
This paper deals with properties of three indirect estimators that are known to be (first order) asymptotically equivalent. Specifically, we examine a) the issue of validity of the formal Edgeworth expansion of an arbitrary order. b) Given a), we are concerned with valid moment approximations and employ them to characterize the second order bias structure of the estimators. Our motivation resides on the fact that one of the three is reported by the relevant literature to be second order unbiased. However, this result was derived without any establishment of validity. We provide this establishment, but we are also able to massively generalize the conditions under which this second order property remains true. In this way, we essentially prove their higher order inequivalence. We generalize indirect estimators by introducing recursive ones, emerging from multistep optimization procedures. We are able to establish higher order unbiaseness for estimators of this sort.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | Stochastic Expansions and Moment Approximations for Three Indirect Estimators |
| Language: | English |
| Keywords: | symptotic Approximation, Second Order Bias Structure, Binding Function, Local Canonical Representation, Convex Variational Distance, Recursive Indirect Estimators, Higher order Bias |
| Subjects: | C - Mathematical and Quantitative Methods > C0 - General Y - Miscellaneous Categories > Y1 - Data: Tables and Charts |
| Item ID: | 122369 |
| Depositing User: | Prof. Phoebe Koundouri |
| Date Deposited: | 12 Oct 2024 10:16 |
| Last Modified: | 12 Oct 2024 10:16 |
| References: | [1] Amari Sh.-Ich. and Nagaoka H., "Methods of Information Geometry", Trans. of Mathematical Monographs, AMS, Ox. Un. Press, 2000. [2] Andrews D.W.K. (2002), "Equivalence of the Higher-order Asymptotic Efficiency of k-step and Extremum Statistics," Econometric Theory, 18, pp. 1040-1085. [3] Arvanitis S. and A. Demos (2010) "Stochastic Expansions and Moment Approximations for three Indirect Estimators" mimeo AUEB, http://www.aueb.gr/users/demos/WorkingPapers/bias-ii.pdf [4] Bhattacharya R.N. , and J.K. Ghosh (1978),"On the validity of the formal Edgeworth expansion", The Annals of Statistics, Vol. 6, No. 2, pp. 434-451. [5] Calzolari, C., Fiorentini G. and E. Sentana (2004), Constrained Indirect Inference Estimation, Review of Economic Studies 71, pp. 945-973. [6] Davidson J. "Stochastic Limit Theory" Oxford University Press, 1994. [7] Demos A. and Kyriakopoulou D., "Edgeworth expansions for the MLE and MM estimators of an MA(1) model", mimeo, AUEB, 2008. [8] Dridi R., and E. Renault,"Semi-parametric Indirect Inference", mimeo, LSE and CREST-INSEE and Universite de Paris IX Dauphine, 2000. [9] Dupacova, J. and R. Wets (1988), "Asymptotic behaviour of Statistical Estimators and of Optimal solutions of Stochastic Optimization Problems", The Annals of Statistics, Vol. 16, No. 4, pp. 1517-1549. [10] Gallant A. Ronald, and Tauchen G.E. (1996), "Which Moments to Match," Econometric Theory, Vol. 12, pp. 657-681. [11] Goetze F., and C. Hipp (1983), "Asymptotic expansions for sums of weakly dependent random vectors", Probability Theory and Related Fields, 64, pp. 211-239. [12] Gourieroux C.,and A. Monfort, "Simulation-based Econometric Methods", CORE Lectures, Ox. Un. Press, 1996. [13] Gourieroux C., A. Monfort, and E. Renault (1993), "Indirect Inference", Journal of Applied Econometrics, Volume 8 Issue 1, pp. 85-118. [14] Gourieroux C., E. Renault and N. Touzi, 2000, "Calibration by simulation for small sample bias correction", in "Simulation-Based Inference in Econometrics: Methods and Applications", Cambridge University Press, Cambridge. [15] Gradshteyn I. S., and Ryzhik I. M., "Table of Integrals, Series, and Products" A. Je§rey Editor, Academic Press 1994. [16] Linton, O. 1997. An asymptotic expansion in the GARCH(1,1) model. Econometric Theory 13, 558-581. [17] Magdalinos M.A. (1992), "Stochastic Expansions and Asymptotic Ap- proximations", Econometric Theory, Vol. 8, No. 3, pp. 343-367. [18] McCullagh P. (1987), "Tensor Methods in Statistics" Chapman and Hall, London, New York. [19] Newey, W.K., and R.J. Smith (2001), "Asymptotic Bias and Equivalence of GMM and GEL Estimators", mimeo, Department of Economics, MIT. [20] Phillips P.C.B. (1980). Finite sample theory and the distribution of alternative estimators of the marginal propensity to consume. Review of Economic Studies 47, 183-224. [21] Sargan, J.D. 1976. Econometric estimators and the Edgeworth approx- imation. Econometrica 44, 421-448. [22] Smith A.A. (1993), "Estimating Nonlinear Time-series Models using Simulated Vector Autoregressions", Journal of Applied Econometrics, Volume 8 Issue 1, pp. 63-84. [23] Spivak Michael, (1999) "A Comprehensive Introduction to DIFFERENTIAL GEOMETRY ", Vol. 1, Publish or Perish, Inc, Texas. [24] van der Vaart, A.W. and J.A. Wellner, (2000) "Weak Convergence and Empirical Processes" Springer. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/122369 |
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