اسلامی، ا و قهرمان، ب. 1392. آنالیز حساسیت و بررسی عدم قطعیت پارامترهای مؤثر در برآورد تبخیر-تعرق مرجع در مدلهای با ساختار ریاضی متفاوت. نشریه آبیاری و زهکشی ایران. 1 .7: 79-68.
انیس حسینی، م و ذاکر مشفق، م. 1393. تحلیل و پیشبینی جریان رودخانه کشکان با استفاده از نظریه آشوب. مجله علمی-پژوهشی هیدرولیک. 8 .3: 45-61.
قاهری، ع.، قربانی، م.ع.، دلافروز، ه. و ملکانی، ل. 1391. ارزیابی جریان رودخانه با استفاده از نظریه آشوب. مجله پژوهش آب ایران.6.10: 126-117.
لطفاللهی یقین، م.ع.، لشتهنشایی، م. ا.، قربانی، م.ع و بیکلریان، م. 1392. مدلسازی و پیشبینی ارتفاع موج شاخص دریای خزر با نظریه آشوب. نشریه علمی-پژوهشی امیرکبیر (مهندسی عمران و محیط زیست). 45.1: 105-97.
مرادیزادهکرمانی، ف.، قربانی، م.ع.، دینپژوه، ی. و فرسادیزاده، د. 1391. مدل تخمین جریان رودخانه بر اساس بازسازی فضای حالت آشوبی. دانش آب و خاک. 4 .22: 16-2.
Box, G.E.P., Jenkins, G.M and Reinsel, G.C. 1994. Time series analysis: forecasting and control, Prentice-Hall, Third Edition, New Jersey,USA.
Chaudhuri, S. 2006. Predictability of chaos inherent in the occurrence ofsevere thunderstorms. Advances
[E1] in Complex Systems, 9: 77–85.
Fraser, A.M., Swinney, H.L. 1986. Independent coordinates for strange attractors from mutual information. Physical Review A. 33: 1134–1140.
Grassberger, P and Procaccia, I. 1983. Measuring the strangeness of strange attractors. Phsica
[E2] D. 9:189-208.
Gutiérrez, R.M. 2004. Optimal nonlinear models from empirical time series: an application to climate. International Journal of Bifurcation and Chaos 14.6: 2041–2052.
Hegger, R., Kantz, H., Schreiber, T. 1999. Practical implementation of nonlinear time series methods: the TISEAN package. Chaos 9: 413–440.
Kantz, H. 1994. A robust method to estimate the maximal Lyaponov exponent of a time series. Physics Letters A 185: 77-87.
Kantz, H., Schreiber, T. 2004. Nonlinear Time Series Analysis. Second edition, Cambridge University Press, Cambridge.
Kellert, S.H. 1993. In the Wake of Chaos: Unpredictable Order in Dynamical Systems. University of Chicago Press. p. 32.
ISBN 0-226-42976-8.
Kennel, M.B., Brown, R., Abarbanel, H.D.I. 1993. Determining embedding dimension for phase space reconstruction using a geometrical construction. Physical
[E3] Review A.45:3403–3411.
Kugiumtzis, D. 1996. State space reconstruction parameters in the analysis of chaotic time series - the role of the time window length. Physica
[E4] D 95:13-28.
Larsen, M.L., Kostinski, A.B., Tokay, A. 2005. Observations and analysis on uncorrelated rain. Journal of the Atmospheric Sciences. 62: 4071–4083.
Li, B.B., Yuan, Z.F. 2008. Non-linear and chaos characteristics of heart soundtime series. Proceedings of the Institution of Mechanical Engineers, Part H: Journal of Engineering in Medicine, 222:265–272.
Lorenz, E.N. 1963. Deterministic nonperiodicflow. Journal of the Atmospheric Sciences 20: 130–141.
Lorenz, E.N. 1993. The Essence of Chaos. UCL Press, Los Angeles.
Millán, H. Ghanbarian-Alavijeh, B., García-Fornaris, I. 2010. Nonlinear dynamics of mean daily temperature and dewpoint time series at Babolsar, Iran. 1961–2005. Atmospheric Research 98, 89–101.
Millán, H. Rodríguez, J., Ghanbarian-Alavijeh, B., Biondi, R and Llerena, G. 2011. Temporal complexity of daily precipitation records from different atmospheric environments: Chaotic and Lévy stable parameters. Journal of Atmospheric Research 101: 879–892.
Rosenstein, M.T., Collins, J.J., De Luca, C.J. 1993. A practical method forcalculating largest Lyapunov exponents from small data sets. Physica D65, 117–134.
Saltzman, B. 1959. On the maintenance of the large-scale quasi-permanentdisturbances in the atmosphere. Tellus.11: 425–431.
Sharifi, M.B., Georgakakos, K.P., Rodriguez-Iturbe, I. 1990. Evidence of deterministic chaos in the pulse of storm rainfall. Journal of the Atmospheric Sciences, 47: 888–893.
Sivakumar, B., Liong, S.Y., Liaw, C.Y. 1996. Analysis of Singapore rainfall characteristics: Chaos. In: Proceedings of the Tenth Congress of the Asian and Pacific Division of the International Association for Hydraulic Research, Langkawi, Malaysia.
Sivakumar, B., Liong, S.Y., Liaw, C.Y. 1998. Evidence of chaotic behavior in Singapore rainfall. Journal of the American Water Resources Association. 34.2: 301–310.
Sivakumar, B., Liong, S.Y., Liaw, C.Y., Phoon, K.K. 1999. Singapore rainfall behavior: chaotic? Journal of Hydrology Engineering, ASCE 4.1: 38–48.
Strozzi, F., Tenrreiro, E.G., Noè, C., Rossi, T., Serati, M., Zaldívar Comenges, J.M. 2007. Application of non-linear time series analysis techniques to the Nordic spot electricity market data. Liuc Papers n. 200, Serie Tecnologia 11.
Takens, F. 1981. Detecting Strange Attractors in Turbulence. : Lecture Notes in Mathematics, Vol. 898.Springer, New York.
Tsonis, A.A., Elsner, J.B., Georgakakos, K.P. 1993. Estimating the dimension ofweather and climate attractors: important issues about the procedureand interpretation. Journal of the Atmospheric Sciences, 50: 2549–2555.
Zang, X and Howell, J. 2004. Dynamics and control of process systems. A proceeding volume from the 7th IFAC symposium, Cambridge, Massachusetts, USA, V. 1, ELSEVIER IFAC publications.
Zhou, Y., Ma, Z and Wang, L. 2002. Chaotic dynamics of the flood series in the Huaihe River Basin for the last 500 years. Journal of hydrology. 258: 100-110.