ICO learning as a measure of transient chaos in PT-symmetric Li\'enard systems

TL;DR

This paper explores how ICO learning reveals transient chaos in PT-symmetric Li'enard oscillators, linking chaotic dynamics with synaptic weight behavior and stability analysis.

Contribution

It introduces a novel application of ICO learning to analyze transient chaos and stability in coupled PT-symmetric Li'enard oscillators.

Findings

Chaos emerges via period-doubling and intermittency routes.

Transient chaos occurs before settling into periodic oscillations.

Synaptic weights stabilize in periodic regimes, reflecting system dynamics.

Abstract

In this article, we investigate the implications of the unsupervised learning rule known as Input-Correlations (ICO) learning in the nonlinear dynamics of two linearly coupled PT-symmetric Li\'enard oscillators. The fixed points of the oscillator have been evaluated analytically and the Jacobian linearization is employed to study their stability. We find that on increasing the amplitude of the external periodic drive, the system exhibits period-doubling cascade to chaos within a specific parametric regime wherein we observe emergent chaotic dynamics. We further notice that the system indicates an intermittency route to chaos in the chaotic regime. Finally, in the period-4 regime of our bifurcation analysis, we predict the emergence of transient chaos which eventually settles down to a period-2 oscillator response which has been further validated by both the maximal Finite-Time Lyapunov Exponent (FTLE) using the well-known Gram-Schmidt orthogonalization technique and the Hilbert Transform of the time-series. In the transiently chaotic regime, we deploy the ICO learning to analyze the time-series from which we identify that when the chaotic evolution transforms into periodic dynamics, the synaptic weight associated with the time-series of the loss oscillator exhibits stationary temporal evolution. This signifies that in the periodic regime, there is no overlap between the filtered signals obtained from the time-series of the coupled PT-symmetric oscillators. In addition, the temporal evolution of the weight associated with the stimulus mimics the behaviour of the Hilbert transform of the time-series.