Halkos, George and Tsilika, Kyriaki (2014): Nonlinear time series analysis of annual temperatures concerning the global Earth climate.
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Abstract
This paper presents results concerning the nonlinear analysis of the mean annual value temperature time series corresponding to the Earth’s global climate for the time period of 713 – 2004. The nonlinear analysis consists of the application of several filtering methods, the estimation of geometrical and dynamical characteristics in the reconstructed phase space, techniques of discrimination between nonlinear low dimensional and linear high dimensional (stochastic) dynamics and tests for serial dependence and nonlinear structure. All study results converge to the conclusion of nonlinear stochastic and complex nature of the global earth climate.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | Nonlinear time series analysis of annual temperatures concerning the global Earth climate |
| Language: | English |
| Keywords: | Nonlinear dynamics; Correlation dimension, Lyapunov exponent; Mutual information function; Chaos. |
| Subjects: | C - Mathematical and Quantitative Methods > C8 - Data Collection and Data Estimation Methodology ; Computer Programs > C80 - General C - Mathematical and Quantitative Methods > C8 - Data Collection and Data Estimation Methodology ; Computer Programs > C88 - Other Computer Software Q - Agricultural and Natural Resource Economics ; Environmental and Ecological Economics > Q5 - Environmental Economics > Q50 - General Q - Agricultural and Natural Resource Economics ; Environmental and Ecological Economics > Q5 - Environmental Economics > Q52 - Pollution Control Adoption and Costs ; Distributional Effects ; Employment Effects Q - Agricultural and Natural Resource Economics ; Environmental and Ecological Economics > Q5 - Environmental Economics > Q54 - Climate ; Natural Disasters and Their Management ; Global Warming |
| Item ID: | 59140 |
| Depositing User: | G.E. Halkos |
| Date Deposited: | 10 Oct 2014 14:51 |
| Last Modified: | 09 Oct 2019 14:36 |
| References: | Ashkenazy Y., Baker D.R., Gildor H. and Havlin S. (2003). Nonlinearity and Multifractality of climate change in the past 420,000 years, Geophysical Research Letters 30 (22), 2146. Athanasiu M.A. and Pavlos G.P. (2001). SVD analysis of the Magnetospheric AE index time series and comparison with low dimensional chaotic dynamics, Nonlinear Processes in Geophysics 8, 95-125. Brock W.A. (1986). Distinguishing Random and Deterministic Systems: abridged version, Journal of Economic Theory, 40, 168-195. Brock W.A. (1988). Nonlinearity and Complex Dynamics in Economics and Finance. In: P. Anderson, K. Arrow and D. Pines (Eds), The Economy as an Evolving Complex System New York: Addison Wesley, p. 77-97. Brock W. and Sayers C. (1988). Is the Business Cycle Characterized by Deterministic Chaos?, Journal of Monetary Economics, 22, 71-90. Brock W.A., Scheinkman J.A., Dechert W.D. and LeBaron B. (1996). A Test for Independence Based On the Correlation Dimension, Econometric Reviews 15 (3), 197-235. Chavas J.P. and Holt M. (1993). On Nonlinear Dynamics: The Case of the Pork Cycle, American Journal of Agricultural Economics 73, 819-828. D'Arrigo R., Jacoby G., et al. (2006a). Northern Hemisphere Tree-Ring-Based STD and RCS Temperature Reconstructions. IGBP PAGES/World Data Center for Paleoclimatology Data Contribution Series #2006-092. NOAA/NCDC Paleoclimatology Program, Boulder CO, USA. D'Arrigo, R., Wilson R. and Jacoby G. (2006b). On the long-term context for late twentieth century warming. Journal of Geophysical Research, 111, D03103, doi:10.1029/2005JD006352 Dymnikov V.P. and Gritsoun A.S. (2001). Climate model attractors: chaos, quasi-regularity and sensitivity to small perturbations of external forcing, Nonlinear Processes in Geophysics 15, 201-209. Frank M., Gencay R. and Stengos T. (1988). International Chaos? European Economic Review, 32, 1569-1584. Frank M. and Stengos T. (1988a). Some Evidence Concerning Macroeconomic Chaos, Journal of Monetary Economics, 22, 423-438. Frank M. and Stengos T. (1988b). Chaotic Dynamics in Economic Time series, Journal of Economic Surveys, 2 (2), 103-133. Gedalin M. and Balikhin M. (2008). Climate of Utopia, Nonlinear Processes in Geophysics 15, 541-549. Halkos G.E. (2006). Econometrics. Theory and Practice, Giourdas Publications, Athens (in Greek). Halkos G.E. (2013). Economy and the Environment: Valuation methods and Management. Liberal Books Publications, Athens (in Greek). Halkos G.E. (2014). The Economics of Climate Change Policy: Critical review and future policy directions," MPRA Paper 56841, University Library of Munich, Germany. Hsieh D. (1989). Testing for Nonlinear Dependence in Daily Foreign Exchange Rates, Journal of Business, 62, 339-368. Iliopoulos A.C., Pavlos G.P. and Athanasiu M.A. (2008). Spatiotemporal Chaos into the Hellenic Seismogenesis: Evidence for a Global Strange Attractor, Nonlinear Phenomena in Complex Systems, 11 (2), 274-279. Iliopoulos A.C. and Pavlos G.P. (2010). Global Low Dimensional Chaos in the Hellenic Region, International Journal of Bifurcation and Chaos, 20 (7), 2071-2095. Lin R.Q., Kreiss H., Kuang W.J. and Leung L.Y. (1991). A study of long-term climate change in a simple seasonal nonlinear climate model, Climate Dynamics, 6, S. 35-41. Nordstrom K.M., Gupta V.K. and Chase T.N. (2005). Role of the hydrological cycle in regulating the planetary climate system of a simple nonlinear dynamical model, Nonlinear Processes in Geophysics, 12, 741–753. Ozawa H., Ohmura A., Lorenz R.D. and Pujol T. (2003). The Second Law of Thermodynamics and the Global Climate System: A review of the maximum entropy production principle, Reviews of Geophysics 41 (4), 1018. Papaioannou G. (2000). Chaotic Time Series Analysis: Theory and Practice, Leader Books, Athens (in Greek). Pavlos G.P., Athanasiu M.A., Anagnostopoulos G.C., Rigas A.G. and Sarris E.T. (2004). Evidence for chaotic dynamics in the Jovian magnetosphere, Planetary and Space Science, 52 (5-6), 513-541. Pavlos G.P., Iliopoulos A.C. and Athanasiu M.A. (2007). Self Organized Criticality or / and Low Dimensional Chaos in Earthquake Processes. Theory and Practice in Hellenic Region, in Nonlinear Dynamics in Geosciences, eds. Tsonis A. & Elsner J., Springer, 235-259. Ramsey J., Sayers C. and Rothman P. (1990). The Statistical Properties of Dimension Calculations Using Small Data Sets: Some economic Applications, International Economic Review, 31 (4), 991-1020. Rial J.A., Pielke Sr. R.A., Beniston M., Claussen M., Canadell J., Cox P., Held H., de Noblet-Ducoudré N., Prinn R., Reynolds J.F. and Salas J.D. (2004). Nonlinearities, feedbacks and critical thresholds within the Earth’s climate system. Climatic Change, 65, 11-38. Scheinkman J. and B. LeBaron (1989). Nonlinear Dynamics and Stock Returns, Journal of Business, 62, 311-337. Schellnhuber H. J. (1999). Earth System Analysis and the Second Copernican Revolution, Nature 402, C19-C26. Schreiber T. and Schmitz A. (1996). Improved surrogate data for nonlinearity test, Physical Review Letters, 77, 635-638. Willey T. (1992). Testing for Nonlinear Dependence in Daily Stock Indices, Journal of Economic Business, 44, 63-76. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/59140 |
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