Geometric noise reduction for multivariate time series.

We propose an algorithm for the reduction of observational noise in chaotic multivariate time series. The algorithm is based on a maximum likelihood criterion, and its goal is to reduce the mean distance of the points of the cleaned time series to the attractor. We give evidence of the convergence of the empirical measure associated with the cleaned time series to the underlying invariant measure, implying the possibility to predict the long run behavior of the true dynamics.

[1]  J. D. Farmer,et al.  Optimal shadowing and noise reduction , 1991 .

[2]  M. Morán,et al.  Degrees of Freedom of a Time Series , 2002 .

[3]  Meyer,et al.  Bayesian reconstruction of chaotic dynamical systems , 2000, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[4]  P. Grassberger,et al.  On noise reduction methods for chaotic data. , 1993, Chaos.

[5]  Eckmann,et al.  Liapunov exponents from time series. , 1986, Physical review. A, General physics.

[6]  Kevin Judd,et al.  Chaotic-time-series reconstruction by the Bayesian paradigm: right results by wrong methods. , 2003, Physical review. E, Statistical, nonlinear, and soft matter physics.

[7]  P. Grassberger,et al.  A simple noise-reduction method for real data , 1991 .

[8]  Stephen M. Hammel,et al.  A noise reduction method for chaotic systems , 1990 .

[9]  Thomas Schreiber,et al.  A noise reduction method for multivariate time series , 1992 .

[10]  S. Pilyugin Shadowing in dynamical systems , 1999 .

[11]  György Barna,et al.  Lyapunov exponents from time series: Variations for an algorithm , 1995, Int. J. Intell. Syst..

[12]  Mike E. Davies,et al.  Noise reduction schemes for chaotic time series , 1994 .

[13]  M. Morán,et al.  Convergence of the Eckmann and Ruelle algorithm for the estimation of Liapunov exponents , 2000, Ergodic Theory and Dynamical Systems.

[14]  Celso Grebogi,et al.  Do numerical orbits of chaotic dynamical processes represent true orbits? , 1987, J. Complex..

[15]  Holger Kantz,et al.  Unbiased reconstruction of the dynamics underlying a noisy chaotic time series. , 1996, Chaos.

[16]  R. Bowen,et al.  MARKOV PARTITIONS FOR AXIOM A DIFFEOMORPHISMS. , 1970 .

[17]  T. Sauer A noise reduction method for signals from nonlinear systems , 1992 .

[18]  Schreiber,et al.  Noise reduction in chaotic time-series data: A survey of common methods. , 1993, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[19]  Patrick E. McSharry,et al.  Better Nonlinear Models from Noisy Data: Attractors with Maximum Likelihood , 1999, chao-dyn/9912002.

[20]  Ulrich Parlitz,et al.  Efficient noncausal noise reduction for deterministic time series. , 2001, Chaos.

[21]  H. Broer Dynamical systems and turbulence, Warwick 1980 , 1981 .

[22]  James A. Yorke,et al.  Noise Reduction: Finding the Simplest Dynamical System Consistent with the Data , 1989 .

[23]  Wayne A. Fuller,et al.  Measurement Error Models , 1988 .

[24]  Hsu,et al.  Local-geometric-projection method for noise reduction in chaotic maps and flows. , 1992, Physical review. A, Atomic, molecular, and optical physics.

[25]  D Sornette,et al.  Statistical methods of parameter estimation for deterministically chaotic time series. , 2004, Physical review. E, Statistical, nonlinear, and soft matter physics.

[26]  Tassos Bountis,et al.  An adaptive way for improving noise reduction using local geometric projection. , 2004, Chaos.

[27]  Yorke,et al.  Noise reduction in dynamical systems. , 1988, Physical review. A, General physics.

[28]  Willi-Hans Steeb,et al.  PROJECTIVE NOISE CLEANING WITH DYNAMIC NEIGHBORHOOD SELECTION , 2000 .

[29]  P. Grassberger,et al.  NONLINEAR TIME SEQUENCE ANALYSIS , 1991 .