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Communications in Statistics - Simulation and Computation Volume 52, 2023 - Issue 6
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Articles

GTL regression: a linear model with skewed and thick-tailed disturbances

Wim Vijverberga Ph.D. Program in Economics, City University of New York Graduate Center, New York City, New York, USA;b IZA, Bonn, GermanyCorrespondence[email protected] [email protected]
ORCID Iconhttps://orcid.org/0000-0002-5270-3694
ORCID Icon &
Takuya Hasebec Faculty of Liberal Arts, Sophia University, Tokyo, JapanCorrespondence[email protected] [email protected]
ORCID Iconhttps://orcid.org/0000-0001-8004-4107
ORCID Icon
Pages 2290-2309 | Received 13 Jun 2020, Accepted 06 Mar 2021, Published online: 12 Apr 2021

References

  • Azzalini, A., and A. Capitanio. 2003. Distributions generated by perturbation of symmetry with emphasis on a multivariate skew t-distribution. Journal of the Royal Statistical Society: Series B (Statistical Methodology) 65 (2):367–89. doi:10.1111/1467-9868.00391.
  • Barndorff-Nielsen, O. E. 1997. Normal inverse gaussian distributions and stochastic volatility modelling. Scandinavian Journal of Statistics 24 (1):1–13.
  • Blattberg, R., and T. Sargent. 1971. Regression with non-gaussian stable disturbances: Some sampling results. Econometrica 39 (3):501–10. doi:10.2307/1913262.
  • Breusch, T. S., J. C. Robertson, and A. H. Welsh. 1997. The emperor’s new clothes: A critique of the multivariate t regression model. Statistica Neerlandica 51 (3):269–86. doi:10.1111/1467-9574.00055.
  • Carroll, R., J. Fan, I. Gijbels, and M. Wand. 1997. Generalized partially linear single-index models. Journal of the American Statistical Association 92 (438):477–89. doi:10.1080/01621459.1997.10474001.
  • Chen, E. H., and W. J. Dixon. 1972. Estimators for the linear regression model based on Winsorized observations. Journal of the American Statistical Association 67 (339):664–71. doi:10.1080/01621459.1972.10481273.
  • Chen, L.-A., A. H. Welsh, and W. Chan. 2001. Estimators for the linear regression model based on Winsorized observations. Statistica Sinica 11 (1):147–72.
  • Fernancez, C., and M. F. Steel. 1999. Multivariate Student-t regression models: Pitfalls and inference. Biometrika 86 (1):153–67.
  • Fernandez, C., and M. F. J. Steel. 1998. On bayesian modeling of fat tails and skewness. Journal of the American Statistical Association 93 (441):359–71. doi:10.2307/2669632.
  • Ferreira, J., and M. Steel. 2006. A constructive representation of univariate skewed distributions. Journal of the American Statistical Association 101 (474):823–9. doi:10.1198/016214505000001212.
  • Freimer, M., G. S. Mudholkar, G. Kollia, and C. T. Lin. 1988. A study of the generalized tukey lambda family. Communications in Statistics - Theory and Methods 17 (10):3547–67. doi:10.1080/03610928808829820.
  • Geweke, J. 1992. Evaluating the accuracy of sampling-based approaches to the calculation of posterior moments. In Bayesian Statistics, eds. J. Bernardo, J. Berger, A. Dawid, and A. Smith, vol. 4, 641–49. Oxford: Oxford University Press.
  • Geweke, J. 1993. Bayesian treatment of the independent student-t linear model. Journal of Applied Econometrics 8 (S1):S19–S40. doi:10.1002/jae.3950080504.
  • Gourieroux, C., A. Monfort, and A. Trognon. 1984. Pseudo maximum likelihood method: Theory. Econometrica 52 (3):681–700. doi:10.2307/1913471.
  • Greenberg, E. 2008. Introduction to bayesian econometrics. Cambridge, UK: Cambridge University Press.
  • Grigoletto, M., and F. Lisi. 2009. Looking for skewness in financial time series. Econometrics Journal 12 (2):310–23. doi:10.1111/j.1368-423X.2009.00281.x.
  • Hallin, M., Y. Swan, T. Verdebout, and D. Veredas. 2011. Rank-based testing in linear models with stable errors. Journal of Nonparametric Statistics 23 (2):305–20. doi:10.1080/10485252.2010.525234.
  • Hallin, M., Y. Swan, T. Verdebout, and D. Veredas. 2013. One-step R-estimation in linear models with stable errors. Journal of Econometrics 172 (2):195–204. doi:10.1016/j.jeconom.2012.08.016.
  • Hansen, C. B., J. B. McDonald, and P. Theodossiou. 2007. Some flexible parametric models for partially adaptive estimators of econometric models. Economics: The Open-Access, Open-Assessment E-Journal 1 (2007-7):1. doi:10.5018/economics-ejournal.ja.2007-7.
  • Harvey, A. C., and G. Sucarrat. 2014. Evaluating density forecasts with applications to financial risk management. Computational Statistics & Data Analysis 76 (SI):320–38. doi:10.1016/j.csda.2013.09.022.
  • Harvey, C. R., and A. Siddique. 1999. Autoregressive conditional skewness. The Journal of Financial and Quantitative Analysis 34 (4):465–87. doi:10.2307/2676230.
  • He, X., J. Jureckova, R. Koenker, and S. Portnoy. 1990. Tail behavior of regression estimators and their breakdown points. Econometrica 58 (5):1195–214. doi:10.2307/2938306.
  • Horowitz, J. L. 1998. Semiparametric methods in econometrics. New York: Springer-Verlag.
  • Huber, P. J. 1964. Robust estimation of a location parameter. The Annals of Mathematical Statistics 35 (1):73–101. doi:10.1214/aoms/1177703732.
  • Huber, P. J. 1981. Robust statistics. New York: Wiley.
  • Huber, P. J., and E. M. Ronchetti. 2009. Robust statistics. 2nd ed. New York: Wiley.
  • Ichimura, H. 1993. Semiparametric least squares (SLS) and weighted SLS estimation of single index models. Journal of Econometrics 58 (1-2):71–204. doi:10.1016/0304-4076(93)90114-K.
  • Jureckova, J., R. Koenker, and S. Portnoy. 2001. Tail behavior of the least-squares estimator. Statistics & Probability Letters 55 (4):377–84. doi:10.1016/S0167-7152(01)00137-7.
  • Karian, Z. A., and E. J. Dudewicz. 1999. Fitting the generalized lambda distribution to data: A method based on percentiles. Communications in Statistics - Simulation and Computation 28 (3):793–819. doi:10.1080/03610919908813579.
  • Karian, Z. A., E. J. Dudewicz, and P. McDonald. 1996. The extended Generalized Lambda Distribution system for fitting distributions to data: History, completion of theory, tables, applications, the ‘final word’ on moment fits. Communications in Statistics - Simulation and Computation 25 (3):611–42. doi:10.1080/03610919608813333.
  • Koenker, R. 2005. Quantile regression. New York: Cambridge University Press.
  • Koenker, R., and G. Bassett. 1978. Regression quantiles. Econometrica 46 (1):33–50. doi:10.2307/1913643.
  • Koenker, R., and S. Portnoy. 1987. L-Estimation for linear models. Journal of the American Statistical Association 82 (399):851–7. doi:10.2307/2288796.
  • Komunjer, I. 2007. Asymmetric power distribution: Theory and applications to risk measurement. Journal of Applied Econometrics 22 (5):891–921. doi:10.1002/jae.961.
  • Koop, G. 2003. Bayesian econometrics. Chichester, UK: John Wiley & Sons Ltd.
  • Lange, K. L., R. J. A. Little, and J. M. G. Taylor. 1989. Robust statistical modeling using the t distribution. Journal of the American Statistical Association 84 (408):881–96. doi:10.2307/2290063.
  • Li, Q., and J. S. Racine. 2007. Nonparametric econometrics. Princeton: Princeton University Press.
  • Makowsky, M. D., and T. Stratmann. 2009. Political economy at any speed: What determines traffic citations? American Economic Review 99 (1):509–27. doi:10.1257/aer.99.1.509.
  • McDonald, J. B., and R. J. Butler. 1987. Generalized mixture distributions with an application to unemployment duration. The Review of Economics and Statistics 69 (2):232–40. doi:10.2307/1927230.
  • Mikosch, T., and C. G. de Vries. 2013. Heavy tails of OLS. Journal of Econometrics 172 (2):205–21. doi:10.1016/j.jeconom.2012.08.015.
  • Nolan, J. P., and D. Ojeda-Revah. 2013. Linear and nonlinear regression with stable errors. Journal of Econometrics 172 (2):186–94. doi:10.1016/j.jeconom.2012.08.008.
  • Öztürk, A., and R. F. Dale. 1985. Least squares estimation of the parameters of the Generalized Lambda distribution. Technometrics 27 (1):81–4. doi:10.1080/00401706.1985.10488017.
  • Powell, J., J. Stock, and T. M. Stoker. 1989. Semiparametric estimation of index coefficients. Econometrica 57 (6):1403–30. doi:10.2307/1913713.
  • Pregibon, D. 1980. Goodness of link tests for generalized linear models. Journal of the Royal Statistical Society, Series C (Applied Statistics) 29 (1):15–23. doi:10.2307/2346405.
  • Press, W. H., S. A. Teukolsky, W. T. Vetterling, and B. P. Flannery. 1986. Numerical recipes: The art of scientific computing. Cambridge: Cambridge University Press.
  • Ramberg, J. S., P. R. Tadikamalla, E. J. Dudewicz, and E. F. Mykytka. 1979. A probability distribution and its uses in fitting data. Technometrics 21 (2):201–14. doi:10.1080/00401706.1979.10489750.
  • Ramberg, J., and B. Schmeiser. 1974. An approximate method for generating asymmetric random variables. Communications of the ACM 17 (2):78–82. doi:10.1145/360827.360840.
  • Samorodnitsky, G., S. T. Rachev, J.-R. Kurz-Kim, and S. V. Stoyanov. 2007. Asymptotic distribution of unbiased linear estimators in the presence of heavy-tailed stochastic regressors and residuals. Probability and Mathematical Statistics 27 (2):275–302.
  • Su, S. 2011. Fitting GLD to data via quantile matching method. In Handbook on fitting statistical distributions with R, chapter 14, ed. Z. Karian, and E. Dudewicz, 557–83. Boca Raton, FL: Chapman & Hall/CRC.
  • Tastan, H. 2016. SPECTDENS: Stata module to compute sample spectral density. Technical report, Boston College Department of Economics, Statistical Software Components S458152.
  • Vijverberg, C.-P. C., and W. P. Vijverberg. 2016. Pregibit: A family of binary choice models. Empirical Economics 50 (3):901–32. doi:10.1007/s00181-015-0951-x.
  • Vijverberg, C.-P. C., W. P. Vijverberg, and S. Taşpınar. 2016. Linking Tukey’s legacy to financial risk measurement. Computational Statistics & Data Analysis 100:595–615. doi:10.1016/j.csda.2015.08.018.
  • White, H. 1982. Maximum likelihood estimation of misspecified models. Econometrica 50 (1):1–25. doi:10.2307/1912526.
  • White, H. 1984. Asymptotic theory for econometrians. San Diego, CA: Academic Press.
  • Wichitaksorn, N., and H. Tsurumi. 2013. Comparison of mcmc algorithms for the estimation of Tobit model with non-normal error: The case of asymmetric Laplace distribution. Computational Statistics & Data Analysis 67:226–35. doi:10.1016/j.csda.2013.06.003.
  • Wraith, D., and F. Forbes. 2015. Location and scale mixtures of gaussians with flexible tail behaviour: Properties, inference and application to multivariate clustering. Computational Statistics & Data Analysis 90:61–73. doi:10.1016/j.csda.2015.04.008.
  • Yale, C., and A. B. Forsythe. 1976. Winsorized regression. Technometrics 18 (3):291–300. doi:10.1080/00401706.1976.10489449.
  • Zellner, A. 1976. Bayesian and non-bayesian analysis of the regression model with multivariate Student t error terms. Journal of the American Statistical Association 71 (354):400. doi:10.2307/2285322.

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