期刊
JOURNAL OF THE ROYAL SOCIETY INTERFACE
卷 17, 期 167, 页码 -出版社
ROYAL SOC
DOI: 10.1098/rsif.2019.0859
关键词
excitable neuron model; fractional dynamics; stability; spiking-bursting; synchronization networks
资金
- University Grants Commission (UGC), Govt. of India under NET-JRF scheme
- Council of Scientific and Industrial Research (CSIR), Govt. of India [25(0277)/17/EMR-II]
- DSTINSPIRE Faculty grant [IFA17-PH193]
Excitable cells often produce different oscillatory activities that help us to understand the transmitting and processing of signals in the neural system. The diverse excitabilities of an individual neuron can be reproduced by a fractional-order biophysical model that preserves several previous memory effects. However, it is not completely clear to what extent the fractional-order dynamics changes the firing properties of excitable cells. In this article, we investigate the alternation of spiking and bursting phenomena of an uncoupled and coupled fractional leech-heart (L-H) neurons. We show that a complete graph of heterogeneous de-synchronized neurons in the backdrop of diverse memory settings (a mixture of integer and fractional exponents) can eventually lead to bursting with the formation of cluster synchronization over a certain threshold of coupling strength, however, the uncoupled L-H neurons cannot reveal bursting dynamics. Using the stability analysis in fractional domain, we demarcate the parameter space where the quiescent or steady-state emerges in uncoupled L-H neuron. Finally, a reduced-order model is introduced to capture the activities of the large network of fractional-order model neurons.
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