Abstract
In this paper, we extend and modify our modelling [presented in the conference paper (Komorník and Komorníková, Predictive and descriptive models of mutual development of economic growth of Germany and selected non-traditional EU countries. In: ITISE 2015, International Work-Conference on Time Series, pp. 55–64. Copicentro Granada S.L, 2015)] of the parallel development of GDP of Germany (as the strongest EU economy), the so-called V4 countries (Poland, the Czech Republic, Hungary, Slovakia) and Greece (as the most problematic EU economy). Unlike in Komorník and Komorníková (Predictive and descriptive models of mutual development of economic growth of Germany and selected non-traditional EU countries. In: ITISE 2015, International Work-Conference on Time Series, pp. 55–64. Copicentro Granada S.L, 2015), we analyse the data provided by OECD (freely available from http://stats.oecd.org/index.aspx?queryid=218) that are expressed in USD (using the expenditure approach) and covering a longer time interval than our former data from EUROSTAT (http://appsso.eurostat.ec.europa.eu/nui/show.do?wai=true&data-set=namq_10_gdp) (expressed in EUR using the output approach). The best predictive quality models were found in the class of multivariate TAR (Threshold Autoregressive) models with aggregation functions’ type thresholds. On the other hand, the best descriptive quality models were found in the competing classes of one-dimensional MSW (Markov Switching) and STAR (Smooth Transition Autoregressive) models.
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References
Bacigál, T.: Multivariate threshold autoregressive models in Geodesy. J. Electr. Eng. 55(12/s), 91–94 (2004)
Calvo, T., Kolesárová, A., Komorníková, M., Mesiar R.: Aggregation operators: properties, classes and construction methods. In: Calvo, T., Mayor, G., Mesiar, R. (eds.) Studies in Fuzziness and Soft Computing, vol. 97, Aggregation Operators: New Trend and Applications, Eds:, pp. 3–106. Physica Verlag, Heidelberg (2002)
EUROSTAT. http://appsso.eurostat.ec.europa.eu/nui/show.do?wai=true&data-set=namq_10_gdp (2015)
Franses, P.H., Dijk, D.: Non-linear Time Series Models in Empirical Finance. Cambridge University Press, Cambridge (2000)
Grabisch, M., Marichal, J.-L., Mesiar, R., Pap, E.: Aggregation Functions. Encyclopedia of Mathematics and its Applications, vol. 127. Cambridge University Press, Cambridge (2009)
Hamilton, J.D.: A new approach to the economic analysis of nonstationary time series and the business cycle. Econometrica 57(2), 357–384 (1989)
Klement, E.P., Mesiar R., Pap, E.: A universal integral as common frame for Choquet and Sugeno integral. IEEE Trans. Fuzzy Syst. 18(1), art. no. 5361437, 178–187 (2010)
Komorník, J., Komorníková, M.: Applications of regime-switching models based on aggregation operators. Kybernetika 43(4), 431–442 (2007)
Komorník, J., Komorníková, M.: Predictive and descriptive models of mutual development of economic growth of Germany and selected non-traditional EU countries. In: ITISE 2015, International Work-Conference on Time Series, pp. 55–64. Copicentro Granada S.L (2015)
Linhart, H., Zucchini, W.: Model Selection. Wiley Series in Probability and Mathematical Statistics. Wiley, New York (1986)
Mesiar, R., Mesiarová-Zemánková, A.: The ordered modular averages. IEEE Trans. Fuzzy Syst. 19(1), 42–50 (2011)
OECD.Stat. http://stats.oecd.org/index.aspx?queryid=218 (2015)
Teräsvirta, T.: Specification, estimation, and evaluation of smooth transition autoregressive models. J. Am. Stat. Assoc. 89, 208–218 (1994)
Tong, H.: On a threshold model. In: C.H. Chen (ed.) Pattern Recognition and Signal Processing. Sijhoff & Noordhoff, Amsterdam (1978)
Tong, H.: Non-linear Time Series: A Dynamical System Approach. Oxford University Press, Oxford (1990)
Tsay, R.S.: Testing and modeling multivariate threshold models. J. Am. Stat. Assoc. 93, 1188–1202 (1998)
Yager, R.R.: On ordered weighted averaging aggregation operators in multicriteria decision making. IEEE Trans. Syst. Man Cybern. 18(1), 183–190 (1988)
Yager, R.R., Kacprzyk, J.: The Ordered Weighted Averaging Operators Theory and Applications. Kluwer, Boston, MA (1997)
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This work was supported by the grants VEGA 1/0420/15 and APVV-14-0013.
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Komorník, J., Komorníková, M. (2016). Predictive and Descriptive Qualities of Different Classes of Models for Parallel Economic Development of Selected EU-Countries. In: Rojas, I., Pomares, H. (eds) Time Series Analysis and Forecasting. Contributions to Statistics. Springer, Cham. https://doi.org/10.1007/978-3-319-28725-6_13
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