Detecting nonlinearity in time series driven by non-Gaussian noise: the case of river flows

Several methods exist for the detection of nonlinearity in univariate time series. In the present work we consider riverflow time series to infer the dynamical characteristics of the rainfall-runoff transformation. It is shown that the non-Gaussian nature of the driving force (rainfall) can distort the results of such methods, in particular when surrogate data techniques are used. Deterministic versus stochastic (DVS) plots, conditionally applied to the decay phases of the time series, are instead proved to be a suitable tool to detect nonlinearity in processes driven by non-Gaussian (Poissonian) noise. An application to daily discharges from three Italian rivers provides important clues to the presence of nonlinearity in the rainfall-runoff transformation.

[1]  B. LeBaron,et al.  A test for independence based on the correlation dimension , 1996 .

[2]  Henry D. I. Abarbanel,et al.  Analysis of Observed Chaotic Data , 1995 .

[3]  N. T. Kottegoda,et al.  Stochastic Modelling of Riverflow Time Series , 1977 .

[4]  William A. Barnett,et al.  A single-blind controlled competition among tests for nonlinearity and chaos , 1996 .

[5]  V. Gupta,et al.  A geomorphologic synthesis of nonlinearity in surface runoff , 1981 .

[6]  W. F. Rogers Some characteristics and implications of drainage basin linearity and non-linearity , 1982 .

[7]  L Ridolfi,et al.  Mean first passage times of processes driven by white shot noise. , 2001, Physical review. E, Statistical, nonlinear, and soft matter physics.

[8]  T. Schreiber Interdisciplinary application of nonlinear time series methods , 1998, chao-dyn/9807001.

[9]  Bellie Sivakumar,et al.  Chaos theory in geophysics: past, present and future , 2004 .

[10]  Gideon Weiss,et al.  Shot noise models for the generation of synthetic streamflow data , 1977 .

[11]  J. Amorocho,et al.  The nonlinear prediction problem in the study of the runoff cycle , 1967 .

[12]  D. H. Pilgrim Travel Times and Nonlinearity of Flood Runoff From Tracer Measurements on a Small Watershed , 1976 .

[13]  Andreas S. Weigend,et al.  Time Series Prediction: Forecasting the Future and Understanding the Past , 1994 .

[14]  D. Kugiumtzis,et al.  Statically transformed autoregressive process and surrogate data test for nonlinearity. , 2001, Physical review. E, Statistical, nonlinear, and soft matter physics.

[15]  P. Claps,et al.  Conceptually-based shot noise modeling of streamflows at short time interval , 1997 .

[16]  Farmer,et al.  Predicting chaotic time series. , 1987, Physical review letters.

[17]  A. Ramachandra Rao,et al.  Linearity analysis on stationary segments of hydrologic time series , 2003 .

[18]  D. Goodrich,et al.  Linearity of basin response as a function of scale in a semiarid watershed , 1997 .

[19]  H. Kantz,et al.  Nonlinear time series analysis , 1997 .

[20]  M. Sivapalan,et al.  On the relative roles of hillslope processes, channel routing, and network geomorphology in the hydrologic response of natural catchments , 1995 .

[21]  F. Takens Detecting strange attractors in turbulence , 1981 .

[22]  G. Weiss TIME-REVERSIBILITY OF LINEAR STOCHASTIC PROCESSES , 1975 .

[23]  T. Schreiber,et al.  Surrogate time series , 1999, chao-dyn/9909037.

[24]  A. Rao,et al.  Gaussianity and linearity tests of hydrologic time series , 1990 .

[25]  Steven J. Schiff,et al.  Tests for nonlinearity in short stationary time series. , 1995, Chaos.

[26]  Bellie Sivakumar,et al.  Chaos theory in hydrology: important issues and interpretations , 2000 .

[27]  Luca Ridolfi,et al.  Nonlinear analysis of river flow time sequences , 1997 .

[28]  M. Casdagli Chaos and Deterministic Versus Stochastic Non‐Linear Modelling , 1992 .

[29]  Kennel,et al.  Symbolic approach for measuring temporal "irreversibility" , 2000, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[30]  Holger Kantz,et al.  Practical implementation of nonlinear time series methods: The TISEAN package. , 1998, Chaos.

[31]  D. T. Kaplan,et al.  Exceptional events as evidence for determinism , 1994 .

[32]  Cees Diks,et al.  Reversibility as a criterion for discriminating time series , 1995 .

[33]  S. Havlin,et al.  Nonlinear volatility of river flux fluctuations. , 2002, Physical review. E, Statistical, nonlinear, and soft matter physics.

[34]  Valerie Isham,et al.  The virtual waiting-time and related processes , 1986, Advances in Applied Probability.

[35]  S. Basu,et al.  Detection of nonlinearity and chaoticity in time series using the transportation distance function , 2002 .

[36]  T. Schreiber,et al.  Discrimination power of measures for nonlinearity in a time series , 1997, chao-dyn/9909043.

[37]  Clark C. K. Liu,et al.  A nonlinear analysis of the relationship between rainfall and runoff for extreme floods , 1978 .

[38]  Luca Ridolfi,et al.  Detecting determinism and nonlinearity in river-flow time series , 2003 .

[39]  H. Stanley,et al.  Magnitude and sign scaling in power-law correlated time series , 2003 .