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Periodicity characterization of the nonlinear magnetization dynamics

J. A. Vélez, J. Bragard, Laura M. Pérez, Ana M. Cabanas, O. J. Suarez, D. Laroze, H. Mancini

2020Chaos An Interdisciplinary Journal of Nonlinear Science26 citationsDOIOpen Access PDF

Abstract

In this work, we study numerically the periodicity of regular regions embedded in chaotic states for the case of an anisotropic magnetic particle. The particle is in the monodomain regime and subject to an applied magnetic field that depends on time. The dissipative Landau-Lifshitz-Gilbert equation models the particle. To perform the characterization, we compute several two-dimensional phase diagrams in the parameter space for the Lyapunov exponents and the isospikes. We observe multiple transitions among periodic states, revealing complex topological structures in the parameter space typical of dynamic systems. To show the finer details of the regular structures, iterative zooms are performed. In particular, we find islands of synchronization for the magnetization and the driven field and several shrimp structures with different periods.

Topics & Concepts

Dissipative systemLyapunov exponentMagnetizationPhysicsStatistical physicsNonlinear systemPhase spaceMagnetic fieldChaoticAnisotropyParameter spaceClassical mechanicsPhase transitionMathematicsCondensed matter physicsComputer scienceQuantum mechanicsGeometryArtificial intelligenceNonlinear Dynamics and Pattern FormationChaos control and synchronizationTheoretical and Computational Physics
Periodicity characterization of the nonlinear magnetization dynamics | Litcius