Switching Activity in an Ensemble of Excitable Neurons

IF 0.8 4区数学 Q3 MATHEMATICS, APPLIED

Regular and Chaotic Dynamics Pub Date : 2024-11-14 DOI:10.1134/S1560354724570036

Alexander G. Korotkov, Sergey Yu. Zagrebin, Elena Yu. Kadina, Grigory V. Osipov

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引用次数: 0

Abstract

In [1], a stable heteroclinic cycle was proposed as a mathematical image of switching activity. Due to the stability of the heteroclinic cycle, the sequential activity of the elements of such a network is not limited in time. In this paper, it is proposed to use an unstable heteroclinic cycle as a mathematical image of switching activity. We propose two dynamical systems based on the generalized Lotka – Volterra model of three excitable elements interacting through excitatory couplings. It is shown that in the space of coupling parameters there is a region such that, when coupling parameters in this region are chosen, the phase space of systems contains unstable heteroclinic cycles containing three or six saddles and heteroclinic trajectories connecting them. Depending on the initial conditions, the phase trajectory will sequentially visit the neighborhood of saddle equilibria (possibly more than once). The described behavior is proposed to be used to simulate time-limited switching activity in neural ensembles. Different transients are determined by different initial conditions. The passage of the phase point of the system near the saddle equilibria included in the heteroclinic cycle is proposed to be interpreted as activation of the corresponding element.

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可兴奋神经元集合中的转换活动

在[1]中，一个稳定的异斜周期被提出作为开关活动的数学图像。由于异斜周期的稳定性，这种网络中元素的顺序活动不受时间限制。本文提出用一个不稳定的异斜环作为开关活动的数学图像。我们提出了两个基于广义Lotka - Volterra模型的三个可激元通过激耦合相互作用的动力系统。结果表明，在耦合参数空间中存在这样一个区域，当选择该区域的耦合参数时，系统的相空间包含包含三个或六个鞍座的不稳定异斜环和连接它们的异斜轨迹。根据初始条件，相位轨迹将依次访问鞍态平衡的邻域（可能不止一次）。所描述的行为被提议用于模拟神经系统中的限时切换活动。不同的瞬态由不同的初始条件决定。在异斜循环中，系统的相点在鞍平衡附近的通过被解释为相应元素的激活。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Regular and Chaotic Dynamics 物理-力学

CiteScore

2.50

自引率

7.10%

发文量

审稿时长

>12 weeks

期刊介绍： Regular and Chaotic Dynamics (RCD) is an international journal publishing original research papers in dynamical systems theory and its applications. Rooted in the Moscow school of mathematics and mechanics, the journal successfully combines classical problems, modern mathematical techniques and breakthroughs in the field. Regular and Chaotic Dynamics welcomes papers that establish original results, characterized by rigorous mathematical settings and proofs, and that also address practical problems. In addition to research papers, the journal publishes review articles, historical and polemical essays, and translations of works by influential scientists of past centuries, previously unavailable in English. Along with regular issues, RCD also publishes special issues devoted to particular topics and events in the world of dynamical systems.