Hostname: page-component-76fb5796d-45l2p Total loading time: 0 Render date: 2024-04-26T00:36:50.371Z Has data issue: false hasContentIssue false
  • English
  • Français

LÉVY-STABLE PRODUCTIVITY SHOCKS

Published online by Cambridge University Press:  01 June 2008

EDOARDO GAFFEO
EDOARDO GAFFEO*
Affiliation:
University of Trento
*
Address correspondence to: Edoardo Gaffeo, Department of Economics and CEEL, University of Trento, Via Inama 5, I-38100 Trento, Italy; e-mail: edoardo.gaffeo@economia.unitn.it.
Get access Rights & Permissions [Opens in a new window]

Abstract

In this paper, we analyze the distribution of TFP growth rates at the four-digit sectoral level for the United States. We find that, contrary to the usual assumption employed in the literature on business cycles theory, technological shocks are not normally distributed. Instead, a Lévy-stable distribution with a divergent variance returns a better fit to the data.

Keywords

TFPLévy-Stable DistributionsBusiness Cycles
Type
Articles
Information
Macroeconomic Dynamics , Volume 12 , Issue 3 , June 2008 , pp. 425 - 443
Copyright
Copyright © Cambridge University Press 2008

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

REFERENCES

Axtell, Robert (2001) Zipf distribution in US firm sizes. Science 293, 181182.CrossRefGoogle ScholarPubMed
Barro, Robert (2005) Rare Disasters and Asset Markets in the Twentieth Century. Mimeo, Harvard University.Google Scholar
Bartelsman, Eric and Winn, Grey (1996) The NBER Manufacturing Productivity Database. NBER Technical working paper no. 205.CrossRefGoogle Scholar
Dupor, Bill (1999) Aggregation and irrelevance in multi-sector models. Journal of Monetary Economics 43, 391409.CrossRefGoogle Scholar
Gabaix, Xavier (2005) The Granular Origins of Aggregate Fluctuations. Mimeo, MIT.Google Scholar
Gnedenko, Boris and Andrey, Kolmogorov (1954) Limit Distributions for Sums of Independent Random Variables. Reading, MA: Addison-Wesley.Google Scholar
Haltiwanger, John (1997) Measuring and analyzing aggregate fluctuations: the importance of building from microeconomic evidence. Federal Reserve Bank of St. Louis Economic Review 79, 5577.Google Scholar
Hansen, Gary and Edward, Prescott (1993) Did technology shocks cause the 1990–1991 recession? American Economic Review 83, 280286.Google Scholar
Horvath, Michael (1998) Cyclicality and sectoral linkages: aggregate fluctuations from independent sectoral shocks. Review of Economic Dynamics 1, 781:808.CrossRefGoogle Scholar
Horvath, Michael (2000), Sectoral shocks and aggregate fluctuations. Journal of Monetary Economics 45, 69106.CrossRefGoogle Scholar
Hulten, Christopher (1978) Growth accounting with intermediary inputs. Review of Economic Studies 45, 511518.CrossRefGoogle Scholar
Jovanovic, Boyan (1987) Micro shocks and aggregate risk. Quarterly Journal of Economics 102, 395409.CrossRefGoogle Scholar
Jovanovic, Boyan (2006) Asymmetric cycles. Review of Economic Studies 73, 145162.CrossRefGoogle Scholar
Kogon, Stephen and Douglas, Williams (1998) Characteristic function based estimation of stable parameters. In Robert Adler, Raisa Feldman and Murad Taqqu (eds.), A Practical Guide to Heavy Tails, pp. 311335. Berlin: Birkhäuser.Google Scholar
Lévy, Paul (1925) Calcul de Probabilités. Paris: Gauthier Villars.Google Scholar
Long, John and Charles, Plosser (1983) Real business cycles. Journal of Political Economy 91, 3969.CrossRefGoogle Scholar
Lucas, Robert (1981) Studies in Business Cycle Theory. Cambridge, MA: MIT Press.Google Scholar
Mandelbrot, Benoit (1960) The Pareto-Lévy law and the distribution of income. International Economic Review 1, 79106.CrossRefGoogle Scholar
Mandelbrot, Benoit (1963) The variation of certain speculative prices. Journal of Business 36, 394419.CrossRefGoogle Scholar
Mandelbrot, Benoit (1969) Long-run linearity, locally Gaussian processes, H-spectra, and infinite variances. International Economic Review 10, 82111.CrossRefGoogle Scholar
Mantegna, Rosario and Eugene, Stanley (1994) Stochastic process with ultraslow convergence to Gaussian: The truncated Lévy flight. Physical Review Letters 73, 29462949.CrossRefGoogle ScholarPubMed
McCulloch, John (1986) Simple consistent estimators of stable distribution parameters. Communications in Statistics: Simulations 15, 11091136.CrossRefGoogle Scholar
McCulloch, John (1998) Linear regression with stable disturbances. In Robert Adler, Raisa Feldman, and Murad Taqqu (eds.), A Practical Guide to Heavy Tails, pp. 489499. Berlin: Birkhäuser.Google Scholar
Michael, John (1983) The stabilized probability plot. Biometrika 70, 1117.CrossRefGoogle Scholar
Mirowski, Philip (2004) Mandelbrot's economics after a quarter-century. In Philip Mirowsky (ed.), The Effortless Economy of Science?, pp. 251270. Durham, NC: Duke University Press.CrossRefGoogle Scholar
Murphy, Kevin, Andrei, Shleifer, and Robert, Vishny (1989) Building blocks of market clearing business cycle models. In Olivier Blanchard and Stanley Fischer (eds.), NBER Macroeconomics Annual 1989, pp. 247301. Cambridge, MA: MIT Press.Google Scholar
Nolan, John (1997) Numerical computation of stable densities and distribution functions. Communications in Statistics: Stochastic Models 13, 759774.Google Scholar
Nolan, John (1999) Fitting data and assessing goodness of fit with stable distributions. In Proceedings of the Conference on Applications of Heavy Tailed Distributions in Economics, Engineering and Statistics. CD-Rom version, Tails42. Washington, DC: American University.Google Scholar
Nolan, John (2007) Stable Distributions. Boston: Birkhäuser.Google Scholar
Pagan, Adrian (1996) The econometrics of financial markets. Journal of Empirical Finance 3, 15102.CrossRefGoogle Scholar
Prescott, Edward (1998) Needed: A theory of total factor productivity. International Economic Review 39, 525552.CrossRefGoogle Scholar
Samorodnitsky, Alex and Murad, Taqqu (1994) Stable Non-Gaussian Random Processes. New York: Chapman & Hall.Google Scholar
Scheinkman, José and Michael, Woodford (1994) Self-organized criticality and economic fluctuations. American Economic Review 84, 417421.Google Scholar
Sornette, Didier (2000) Critical Phenomena in Natural Sciences. Berlin: Springer.CrossRefGoogle Scholar
Weitzman, Martin (2005), Risk, Uncertainty, and Asset-Pricing “Puzzles.” Mimeo, Harvard University.Google Scholar
Weron, Rafal (2004) Computationally intensive value at risk calculations. In Gentle, James, Härdle, Wolfgang, and Mori, Yuichi (eds.), Handbook of Computational Statistics, pp. 911950. Berlin: Springer.Google Scholar
Zarnowitz, Victor (1992) Business Cycles: Theory, History, Indicators and Forecasting. Chicago: University of Chicago Press.CrossRefGoogle Scholar