Exploring US business cycles with bivariate loops using penalized spline regression. (English) Zbl 1242.91216
Summary: The phrase business cycle is usually used for short term fluctuations in macroeconomic time series. In this paper we focus on the estimation of business cycles in a bivariate manner by fitting two series simultaneously. The underlying model is thereby nonparametric in that no functional form is prespecified but smoothness of the functions are assumed. The functions are then estimated using penalized spline estimation. The bivariate approach will allow to compare business cycles, check and compare phase lengths and visualize this in forms of loops in a bivariate way. Moreover, the focus is on separation of long and short phase fluctuation, where only the latter is the classical business cycle while the first is better known as Friedman or Goodwin cycle, respectively. Again, we use nonparametric models and fit the functional shape with penalized splines. For the separation of long and short phase components we employ an Akaike criterion.
MSC:
| 91G70 | Statistical methods; risk measures |
| 62P05 | Applications of statistics to actuarial sciences and financial mathematics |
| 62J02 | General nonlinear regression |
Keywords:
penalized spline regression; bivariate nonparametric regression; business cycle; distributive cycleReferences:
| [1] | Akaike H. (1974) A new look at the statistical model identification. IEEE Transactions on Automatic Control 19(6): 716–723. doi: 10.1109/TAC.1974.1100705 MR0423716. · Zbl 0314.62039 · doi:10.1109/TAC.1974.1100705 |
| [2] | Akritas M., Politis D. (2003) Recent advances and trends in nonparametric statistics. Elsevier, Amsterdam · Zbl 1186.62044 |
| [3] | Atkinson A. (1969) The timescale of economic models: How long is the long run?. Review of Economic Studies 36: 137–152 · doi:10.2307/2296833 |
| [4] | Baxter M., King R. (1999) Measuring business cycles: Approximate band-pass filters for economic time series. The Review of Economics and Statistics 81(4): 575–593 · doi:10.1162/003465399558454 |
| [5] | Breslow N. E., Clayton D. G. (1993) Approximate inference in generalized linear mixed model. Journal of the American Statistical Association 88: 9–25 · Zbl 0775.62195 |
| [6] | Brockwell P. J., Davis R. A. (1987) Time series: Theory and methods. Springer, Berlin · Zbl 0604.62083 |
| [7] | Burns A. F., Mitchell W. C. (1946) Measuring business cycles. National Bureau of Economic Research, New York |
| [8] | Chiarella C., Flaschel P., Franke R. (2005) Foundations for a disequilibrium theory of the business cycle. Qualitative analysis and quantitative assessment. Cambridge University Press, Cambridge |
| [9] | Christiano L. J., Fitzgerald T. J. (2003) The band pass filter. International Economic Review 44(2): 435–465 · doi:10.1111/1468-2354.t01-1-00076 |
| [10] | Currie I., Durban M. (2002) Flexible smoothing with P-splines: A unified approach. Statistical Modelling 2: 333–349 · Zbl 1195.62072 · doi:10.1191/1471082x02st039ob |
| [11] | de Boor C. (1978) A practical guide to splines. Springer, Berlin · Zbl 0406.41003 |
| [12] | Durban M., Currie I. (2003) A note on P-spline additive models with correlated errors. Computational Statistics 18: 251–262 · Zbl 1050.62042 |
| [13] | Eilers P., Marx B. (1996) Flexible smoothing with b-splines and penalties. Statistical Science 11(2): 89–121 · Zbl 0955.62562 · doi:10.1214/ss/1038425655 |
| [14] | Einbeck J., Tutz G., Evers L. (2005) Local principle curves. Statistics and Computing 15(4): 301–313 · doi:10.1007/s11222-005-4073-8 |
| [15] | Eubank R. L. (1989) Spline smoothing and nonparametric regression. Dekker, New York · Zbl 0702.62036 |
| [16] | Fan J., Gijbels I. (1996) Local polynomial modelling and its applications. Chapman & Hall, London · Zbl 0873.62037 |
| [17] | Fan J., Yao Q. (2003) Nonlinear time series: Nonparametric and parametric methods. Springer, New York · Zbl 1014.62103 |
| [18] | Fisher N. (1995) Statistical analysis of circular data (3rd ed.). Cambridge University Press, Cambridge |
| [19] | Flaschel, P., Kauermann, G., & Teuber, T. (2008). Long cycles in employment, inflation and real unit wage costs. Qualitative analysis and quantitative assessment. American Journal of Applied Sciences, 69–77. |
| [20] | Friedman M. (1968) The role of monetary policy. American Economic Review 58: 1–17 |
| [21] | Gallegati, M., Ramsey, J. B., & Semmler, W. (2006). The decomposition of the inflation-unemployment relationship by time scale using wavelets. In C. Chiarella, R. Franke, P. Flaschel, & W. Semmler (Eds.), Quantitative and empirical analysis on nonlinear dynamic macromodels, Vol. 277 of Quantitative and empirical analysis of nonlinear dynamic models (Chap. 4, pp. 93–112). Amsterdam: Elsevier. · Zbl 1284.91369 |
| [22] | Goodwin R. (1967) A growth cycle. In: Feinstein C. (eds) Socialism, capitalism and economic growth. Cambridge University Press, Cambridge, pp 54–58 |
| [23] | Härdle W., Marron J. S. (1991) Bootstrap simultaneous error bars for nonparametric regression. The Annals of Statistics 19(2): 778–796 · Zbl 0725.62037 · doi:10.1214/aos/1176348120 |
| [24] | Harvey A., Jaeger A. (1993) Detrending, stylized facts and the business cycle. Journal of Applied Econometrics 8: 231–247 · doi:10.1002/jae.3950080302 |
| [25] | Hastie T., Stützle W. (1989) Principle curves. Journal of the American Statistical Association 84: 502–516 · Zbl 0679.62048 · doi:10.1080/01621459.1989.10478797 |
| [26] | Hastie T., Tibshirani R. (1990) Generalized additive models. Chapman and Hall, London · Zbl 0747.62061 |
| [27] | Härdle W., Lütkepohl H., Chen R. (1997) A review of nonparametric time series analysis. International Statistical Review 65: 49–72 · Zbl 0887.62043 |
| [28] | Hodrick R., Prescott E. (1997) Postwar U.S. Business Cycles: An empirical investigation. Journal of Money, Credit, and Banking 29: 1–16 · doi:10.2307/2953682 |
| [29] | Kauermann G. (2005) Penalised spline fitting in multivariable survival models with varying coefficients. Computational Statistics and Data Analysis 49: 169–186 · Zbl 1429.62141 · doi:10.1016/j.csda.2004.05.006 |
| [30] | Kauermann G., Krivobokova T., Fahrmeir L. (2009) Some asymptotic results on generalized penalized spline smoothing. Journal of the Royal Statistical Society, Series B 71(2): 487–503 · Zbl 1248.62055 · doi:10.1111/j.1467-9868.2008.00691.x |
| [31] | Kauermann, G., Krivobokova, T., & Semmler, W. (2011). Filtering time series with penalized splines. Studies in Nonlinear Dynamics and Econometrics, 15(2), Article 2. |
| [32] | Koopmans T. C. (1947) Measurement without theory. Review of Economic Statistics 29: 161–172 · doi:10.2307/1928627 |
| [33] | Krivobokova T., Kauermann G. (2007) A note on penalized spline smoothing with correlated errors. Journal of the American Statistical Association 102: 1328–1337 · Zbl 1333.62018 · doi:10.1198/016214507000000978 |
| [34] | Kydland, F. E., & Prescott, E. C. (1990). Business cycles: Real facts and a monetary myth. Federal Reserve Bank of Minneapolis Quarterly Review, 14(Spring), 3–18. |
| [35] | Li Y., Ruppert D. (2008) On the asymptotics of penalized splines. Biometrika 95: 415–436 · Zbl 1437.62540 · doi:10.1093/biomet/asn010 |
| [36] | Lindstrom M., Bates D. (1990) Nonlinear mixed-effects models for repeated measures data. Biometrics 46: 673–687 · doi:10.2307/2532087 |
| [37] | Long J., Plosser C. (1983) Real business cycles. Journal of Political Economy 91(1): 39–69 · doi:10.1086/261128 |
| [38] | Lotka A. (1925) Elements of physical biology. Williams and Wilkins Co, Baltimore · JFM 51.0416.06 |
| [39] | Lucas, R. E. J. (1977). Understanding business cycles. In: K. Brunner, & A. H. Meltzer (Ed.) Stabilization of the domestic and international economy, Vol. 5 of Carnegie–Rochester Conference series on Public policy (pp. 7–29). Amsterdam: North-Holland. |
| [40] | Mao W., Zhao L. (2003) Free-knot polynomial splines with confidence intervals. Journal of the Royal Statistical Society, Series B 65: 901–919 · Zbl 1059.62044 · doi:10.1046/j.1369-7412.2003.00422.x |
| [41] | Opsomer J., Wang Y., Yang Y. (2001) Nonparametric regression with correlated errors. Statistical Science 16: 134–153 · Zbl 1059.62537 · doi:10.1214/ss/1009213287 |
| [42] | O’Sullivan F. (1986) A statistical perspective on ill-posed inverse problems (c/r: P519–527). Statistical Science 1: 502–518 · doi:10.1214/ss/1177013525 |
| [43] | Paige R., Trindade A. (2010) The Hodrick–Prescott filter: A special case of penalized spline smoothing. Electronic Journal of Statistics 4: 856–874 · Zbl 1329.62200 · doi:10.1214/10-EJS570 |
| [44] | Pedregal D., Young P. (2001) Some comments on the use and abuse of the Hodrick–Prescott filter. Review on Economic Cycles, International Association of Economic Cycles 3(1): 93–104 |
| [45] | Proietti T. (2005) Forecasting and signal extraction with misspecified models. Journal of Forecasting 24: 539–556 · doi:10.1002/for.970 |
| [46] | Ruppert D. (2002) Selecting the number of knots for penalized splines. Journal of Computational and Graphical Statistics 11: 735–757 · doi:10.1198/106186002853 |
| [47] | Ruppert D. (2004) Statistics and finance–An introduction. Springer, New York · Zbl 1049.91083 |
| [48] | Ruppert D., Wand M., Carroll R. (2003) Semiparametric regression. Cambridge University Press, Cambridge · Zbl 1038.62042 |
| [49] | Ruppert D., Wand M., Carroll R. (2009) Semiparametric regression during 2003–2007. Journal of the American Statistical Association 3: 1193–1256 · Zbl 1326.62094 |
| [50] | Schlicht E. (2005) Estimating the smoothing parameter in the so-called Hodrick–Prescott filter. Journal of the Japanese Statistical Society 35(1): 99–119 · Zbl 1070.62079 |
| [51] | Solow R. (1990) Goodwin’s growth cycle: Reminiscence and rumination. In: Velupillai K. (eds) Nonlinear and multisectoral macrodynamics. Essays in Honour of Richard Goodwin. Macmillan, London, pp 31–41 |
| [52] | Stock J. H., Watson M. W. (1999) Business cycle fluctuations in us macroeconomic Vol. 1A. In: Taylor J. B., Woodford M. (eds) Handbook of macroeconomics. Elsevier, North-Holland, pp 3–64 |
| [53] | Tschernig R. (2004) Nonparametric time series modelling. In: Lütkepohl H., Krätzig M. (eds) Applied time series econometrics. Cambridge University Press, New York |
| [54] | Volterra V. (1926) Fluctuations in the abundance of a species considered mathematically. Nature 118: 558–560 · JFM 52.0453.03 · doi:10.1038/118558a0 |
| [55] | Wahba G. (1990) Spline models for observational data. SIAM, Philadelphia · Zbl 0813.62001 |
| [56] | Wand M. (2003) Smoothing and mixed models. Computational Statistics 18: 223–249 · Zbl 1050.62049 |
| [57] | Welham S., Cullis B., Kenward M., Thompson R. (2006) The analysis of longitudinal data using mixed model L-splines. Biometrics 62: 392–401 · Zbl 1097.62144 · doi:10.1111/j.1541-0420.2005.00500.x |
| [58] | Wood S. N. (2006) Generalized additive models: An introduction with R. Chapman and Hall/CRC, Boca Raton |
This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. In some cases that data have been complemented/enhanced by data from zbMATH Open. This attempts to reflect the references listed in the original paper as accurately as possible without claiming completeness or a perfect matching.
