Email this article Stable Relaxation Cycle in a Bilocal Neuron Model
- Authors: Glyzin S.D.1,2, Kolesov A.Y.1, Rozov N.K.3
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Affiliations:
- Demidov Yaroslavl State University
- Scientific Center of the Russian Academy of Sciences in Chernogolovka
- Lomonosov Moscow State University
- Issue: Vol 54, No 10 (2018)
- Pages: 1285-1309
- Section: Ordinary Differential Equations
- URL: https://journals.rcsi.science/0012-2661/article/view/154846
- DOI: https://doi.org/10.1134/S0012266118100026
- ID: 154846
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Abstract
We consider the so-called bilocal neuron model, which is a special system of two nonlinear delay differential equations coupled by linear diffusion terms. The system is invariant under the interchange of phase variables. We prove that, under an appropriate choice of parameters, the system under study has a stable relaxation cycle whose components turn into each other under a certain phase shift.
About the authors
S. D. Glyzin
Demidov Yaroslavl State University; Scientific Center of the Russian Academy of Sciences in Chernogolovka
Author for correspondence.
Email: glyzin@uniyar.ac.ru
Russian Federation, Yaroslavl, 150003; Moscow, Moscow oblast, 142432
A. Yu. Kolesov
Demidov Yaroslavl State University
Email: glyzin@uniyar.ac.ru
Russian Federation, Yaroslavl, 150003
N. Kh. Rozov
Lomonosov Moscow State University
Email: glyzin@uniyar.ac.ru
Russian Federation, Moscow, 119991
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