Chaotic saddles in a generalized Lorenz model of magnetoconvection

TL;DR

This paper investigates the complex chaotic dynamics in a generalized Lorenz model of magnetoconvection, revealing the role of chaotic saddles in fractal basin boundaries and transient behavior.

Contribution

It introduces the analysis of chaotic saddles in a generalized Lorenz model, linking their properties to chaotic attractors and transient dynamics in magnetoconvection.

Findings

Chaotic saddles cause fractal basin boundaries.

Long chaotic transients are observed due to chaotic saddles.

Chaotic saddles help infer properties of attractors outside periodic windows.

Abstract

The nonlinear dynamics of a recently derived generalized Lorenz model (Macek and Strumik, Phys. Rev. E 82, 027301, 2010) of magnetoconvection is studied. A bifurcation diagram is constructed as a function of the Rayleigh number where attractors and nonattracting chaotic sets coexist inside a periodic window. The nonattracting chaotic sets, also called chaotic saddles, are responsible for fractal basin boundaries with a fractal dimension near the dimension of the phase space, which causes the presence of very long chaotic transients. It is shown that the chaotic saddles can be used to infer properties of chaotic attractors outside the periodic window, such as their maximum Lyapunov exponent.