Onatski, Alexei and Uhlig, Harald (2009): Unit Roots in White Noise.
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Abstract
We show that the empirical distribution of the roots of the vector auto-regression of order n fitted to T observations of a general stationary or non-stationary process, converges to the uniform distribution over the unit circle on the complex plane, when both T and n tend to infinity so that (ln T ) /n → 0 and n^3/T → 0. In particular, even if the process is a white noise, the roots of the estimated vector auto-regression will converge by absolute value to unity.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | Unit Roots in White Noise |
| Language: | English |
| Keywords: | unit roots, unit root, white noise, asymptotics, autoregression, Granger and Jeon, clustering of roots |
| Subjects: | C - Mathematical and Quantitative Methods > C3 - Multiple or Simultaneous Equation Models ; Multiple Variables > C32 - Time-Series Models ; Dynamic Quantile Regressions ; Dynamic Treatment Effect Models ; Diffusion Processes ; State Space Models C - Mathematical and Quantitative Methods > C2 - Single Equation Models ; Single Variables > C22 - Time-Series Models ; Dynamic Quantile Regressions ; Dynamic Treatment Effect Models ; Diffusion Processes C - Mathematical and Quantitative Methods > C0 - General > C01 - Econometrics |
| Item ID: | 14060 |
| Depositing User: | Harald Uhlig |
| Date Deposited: | 14 Mar 2009 06:55 |
| Last Modified: | 21 Oct 2019 14:13 |
| References: | Berk, K. N. (1974),"Consistent autoregressive spectral estimates", Annals of Statistics 2, No3, 489-502. Edelman, A. and Kostlan, E. (1995) "How many zeros of a random polynomial are real?", Bulletin of the American Mathematical Society 32, pp. 1-37. Erdos, P. and Turan, P. (1950) "On the distribution of roots of polynomials" , Annals of Mathematics 51, 105-119. Granger, C.W.J. and Y. Jeon (2006) "Dynamics of Model Overfitting Measured in Terms of Autoregressive Roots", Journal of Time Series Analysis 27, 347-365. Horn, R.A. and Johnson C.R. (1991) Topics in Matrix Analysis, Cambridge University Press, Cambridge, New York, Port Chester, Melbourne, Sydney. Johansen, S. (2003) "The asymptotic variance of the estimated roots in a cointegrated vector autoregressive model", Journal of Time Series Analysis, 24, 663-678. Lewis, R. and G.C. Reinsel (1985) "Prediction of Multivariate Time Series by Autoregressive Model Fitting", Journal of Multivariate Analysis 16, 393-411. Muller, Ulrich K. and Mark W. Watson (2008), "Testing Models of Low-Frequency Variability", Econometrica 76 (5), 979-1016. Nielsen, B. and Nielsen, H. B. (2008) "Properties of Estimated Characteristic Roots", Univ. of Copenhagen Dept. of Economics Discussion Paper No. 08-13. Saikkonen, P., and H. Lutkepohl (1996) "Infinite-Order Cointegrated Vector Autoregressive Processes: Estimation and Inference", Econometric Theory 12, 814-844. Shparo, D.I. and M.G. Schur (1962) "On the Distribution of Roots of Random Polynomials", Vestnik Moskovskogo Universiteta, Series 1: Mathematics and Mechanics, no.3, pp. 40-43. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/14060 |
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Unit Roots in White Noise. (deposited 14 Mar 2009 06:55)
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