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Updated: Oct 21, 2025

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Radius selection using kernel density estimation for the computation of nonlinear measures.

Johan Medrano1, Abderrahmane Kheddar1, Annick Lesne2

  • 1LIRMM, CNRS UMR 5506, University of Montpellier, F-34095 Montpellier, France.

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|September 2, 2021
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Summary
This summary is machine-generated.

Selecting the optimal radius is crucial for accurate nonlinear time series analysis. This study introduces a systematic method using Kernel Density Estimation (KDE) to determine the optimal radius, improving correlation dimension and entropy estimation.

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Area of Science:

  • Nonlinear dynamics
  • Time series analysis
  • Statistical signal processing

Background:

  • Estimating nonlinear measures from finite temporal signals requires careful radius selection to prevent poor estimations.
  • Nonlinear measures often rely on the correlation integral, which calculates neighbor proximity based on a radius parameter.
  • Existing empirical rules for radius selection lack a systematic approach.

Purpose of the Study:

  • To introduce a systematic method for selecting the optimal radius parameter in nonlinear time series analysis.
  • To demonstrate the utility of Kernel Density Estimation (KDE) for determining this optimal radius.
  • To improve the accuracy of nonlinear measures like correlation dimension and Kolmogorov-Sinai entropy estimation.

Main Methods:

  • Approximating the optimal radius using the optimal bandwidth from Kernel Density Estimation (KDE).
  • Deriving a closed-form expression for the optimal radius based on KDE principles.
  • Applying the derived optimal radius to compute correlation dimension and construct recurrence plots.

Main Results:

  • The optimal radius for nonlinear measures can be effectively approximated by the optimal bandwidth of a related Kernel Density Estimator (KDE).
  • A closed-form expression for the optimal radius was derived using KDE.
  • The method was validated on both simulated nonlinear system signals and experimental electroencephalographic (EEG) data.

Conclusions:

  • The proposed KDE-based method offers a systematic and robust approach to optimal radius selection in nonlinear time series analysis.
  • This method enhances the accuracy of key nonlinear measures, including correlation dimension and Kolmogorov-Sinai entropy estimation.
  • The findings have implications for analyzing complex temporal data across various scientific domains, including neuroscience.