Busca avançada
Ano de início
(Referência obtida automaticamente do Web of Science, por meio da informação sobre o financiamento pela FAPESP e o número do processo correspondente, incluída na publicação pelos autores.)

Conditional Lyapunov exponents and transfer entropy in coupled bursting neurons under excitation and coupling mismatch

Texto completo
Soriano, Diogo C. [1, 2] ; dos Santos, Odair V. [3] ; Suyama, Ricardo [1, 2] ; Fazanaro, Filipe I. [1] ; Attux, Romis [2, 4]
Número total de Autores: 5
Afiliação do(s) autor(es):
[1] Fed Univ ABC, Ctr Engn Modeling & Appl Social Sci CECS, Santo Andre - Brazil
[2] Brazilian Inst Neurosci & Neurotechnol BRAINN, Campinas, SP - Brazil
[3] Fed Univ Tocantins, Arraias, TO - Brazil
[4] Univ Estadual Campinas, UNICAMP, Sch Elect & Comp Engn FEEC, Dept Comp Engn & Ind Automat DCA, Campinas, SP - Brazil
Número total de Afiliações: 4
Tipo de documento: Artigo Científico
Citações Web of Science: 1

This work has a twofold aim: (a) to analyze an alternative approach for computing the conditional Lyapunov exponent (lambda(cmax)) aiming to evaluate the synchronization stability between nonlinear oscillators without solving the classical variational equations for the synchronization error dynamical system. In this first framework, an analytic reference value for lambda(cmax) is also provided in the context of Duffing master-slave scenario and precisely evaluated by the proposed numerical approach; (b) to apply this technique to the study of synchronization stability in chaotic Hindmarsh-Rose (HR) neuronal models under uni- and bi-directional resistive coupling and different excitation bias, which also considered the root mean square synchronization error, information theoretic measures and asymmetric transfer entropy in order to offer a better insight of the synchronization phenomenon. In particular, statistical and information theoretical measures were able to capture similarity increase between the neuronal oscillators just after a critical coupling value in accordance to the largest conditional Lyapunov exponent behavior. On the other hand, transfer entropy was able to detect neuronal emitter influence even in a weak coupling condition, i.e. under the increase of conditional Lyapunov exponent and apparently desynchronization tendency. In the performed set of numerical simulations, the synchronization measures were also evaluated for a two-dimensional parameter space defined by the neuronal coupling (emitter to a receiver neuron) and the (receiver) excitation current. Such analysis is repeated for different feedback couplings as well for different (emitter) excitation currents, revealing interesting characteristics of the attained synchronization region and conditions that facilitate the emergence of the synchronous behavior. These results provide a more detailed numerical insight of the underlying behavior of a HR in the excitation and coupling space, being in accordance with some general findings concerning HR coupling topologies. As a perspective, besides the synchronization overview from different standpoints, we hope that the proposed numerical approach for conditional Lyapunov exponent evaluation could outline a valuable strategy for studying neuronal stability, especially when realistic models are considered, in which analytical or even Jacobian evaluation could define a laborious or impracticable task. (C) 2017 Elsevier B.V. All rights reserved. (AU)

Processo FAPESP: 13/07559-3 - Instituto Brasileiro de Neurociência e Neurotecnologia - BRAINN
Beneficiário:Fernando Cendes
Linha de fomento: Auxílio à Pesquisa - Centros de Pesquisa, Inovação e Difusão - CEPIDs