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Autores principales: Fen, Mehmet Onur, Fen, Fatma Tokmak
Formato: Preprint
Publicado: 2023
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Acceso en línea:https://arxiv.org/abs/2312.11471
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author Fen, Mehmet Onur
Fen, Fatma Tokmak
author_facet Fen, Mehmet Onur
Fen, Fatma Tokmak
contents Two novel phenomena for unidirectionally coupled 3-cell Hopfield neural networks (HNNs) are investigated. The first one is the persistence of chaos, which means the permanency of sensitivity and infinitely many unstable periodic oscillations in the response HNN even if the networks are not synchronized in the generalized sense. Doubling of chaotic attractors is the second phenomenon realized in this study. It can be achieved when the response network possesses two stable point attractors in the absence of the driving. This feature leads to the formation of two coexisting chaotic attractors with disjoint basins. Lyapunov functions are utilized to deduce the presence of an invariant region, and the sensitivity is rigorously proved. The absence of synchronization is approved via the auxiliary system approach and analysis of conditional Lyapunov exponents. Additionally, quadruple and octuple coexisting chaotic attractors are demonstrated, and the formation of hyperchaos is discussed.
format Preprint
id arxiv_https___arxiv_org_abs_2312_11471
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Persistence and Doubling of Chaotic Attractors in Coupled 3-Cell Hopfield Neural Networks
Fen, Mehmet Onur
Fen, Fatma Tokmak
Adaptation and Self-Organizing Systems
Chaotic Dynamics
68T07, 34C28
Two novel phenomena for unidirectionally coupled 3-cell Hopfield neural networks (HNNs) are investigated. The first one is the persistence of chaos, which means the permanency of sensitivity and infinitely many unstable periodic oscillations in the response HNN even if the networks are not synchronized in the generalized sense. Doubling of chaotic attractors is the second phenomenon realized in this study. It can be achieved when the response network possesses two stable point attractors in the absence of the driving. This feature leads to the formation of two coexisting chaotic attractors with disjoint basins. Lyapunov functions are utilized to deduce the presence of an invariant region, and the sensitivity is rigorously proved. The absence of synchronization is approved via the auxiliary system approach and analysis of conditional Lyapunov exponents. Additionally, quadruple and octuple coexisting chaotic attractors are demonstrated, and the formation of hyperchaos is discussed.
title Persistence and Doubling of Chaotic Attractors in Coupled 3-Cell Hopfield Neural Networks
topic Adaptation and Self-Organizing Systems
Chaotic Dynamics
68T07, 34C28
url https://arxiv.org/abs/2312.11471