Saddle Slow Manifolds and Canard Orbits in [Formula: see text] and Application to the Full Hodgkin-Huxley Model.

IF 2.3 4区 医学 Q1 Neuroscience Journal of Mathematical Neuroscience Pub Date : 2018-04-19 DOI:10.1186/s13408-018-0060-1
Cris R Hasan, Bernd Krauskopf, Hinke M Osinga
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引用次数: 9

Abstract

Many physiological phenomena have the property that some variables evolve much faster than others. For example, neuron models typically involve observable differences in time scales. The Hodgkin-Huxley model is well known for explaining the ionic mechanism that generates the action potential in the squid giant axon. Rubin and Wechselberger (Biol. Cybern. 97:5-32, 2007) nondimensionalized this model and obtained a singularly perturbed system with two fast, two slow variables, and an explicit time-scale ratio ε. The dynamics of this system are complex and feature periodic orbits with a series of action potentials separated by small-amplitude oscillations (SAOs); also referred to as mixed-mode oscillations (MMOs). The slow dynamics of this system are organized by two-dimensional locally invariant manifolds called slow manifolds which can be either attracting or of saddle type.In this paper, we introduce a general approach for computing two-dimensional saddle slow manifolds and their stable and unstable fast manifolds. We also develop a technique for detecting and continuing associated canard orbits, which arise from the interaction between attracting and saddle slow manifolds, and provide a mechanism for the organization of SAOs in [Formula: see text]. We first test our approach with an extended four-dimensional normal form of a folded node. Our results demonstrate that our computations give reliable approximations of slow manifolds and canard orbits of this model. Our computational approach is then utilized to investigate the role of saddle slow manifolds and associated canard orbits of the full Hodgkin-Huxley model in organizing MMOs and determining the firing rates of action potentials. For ε sufficiently large, canard orbits are arranged in pairs of twin canard orbits with the same number of SAOs. We illustrate how twin canard orbits partition the attracting slow manifold into a number of ribbons that play the role of sectors of rotations. The upshot is that we are able to unravel the geometry of slow manifolds and associated canard orbits without the need to reduce the model.

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公式:见正文]中的鞍慢流形和卡纳轨道以及在全霍奇金-赫胥黎模型中的应用。
许多生理现象都有这样一个特性,即某些变量的演化要比其他变量快得多。例如,神经元模型通常涉及可观察到的时间尺度差异。霍奇金-赫胥黎模型以解释乌贼巨轴突产生动作电位的离子机制而闻名。鲁宾和韦希塞尔伯格(Biol. Cybern. 97:5-32, 2007)对这一模型进行了非维度化处理,得到了一个具有两个快变量、两个慢变量和一个明确的时间尺度比ε的奇异扰动系统。该系统的动力学非常复杂,具有周期性轨道特征,一系列动作电位被小振幅振荡(SAOs)(也称为混合模式振荡(MMOs))分开。在本文中,我们介绍了计算二维鞍状慢流形及其稳定和不稳定快流形的一般方法。我们还开发了一种检测和延续相关卡纳轨道的技术,它产生于吸引型和鞍型慢流形之间的相互作用,并提供了一种组织 SAOs 的机制[公式:见正文]。我们首先用折叠节点的扩展四维法线形式来测试我们的方法。结果表明,我们的计算给出了该模型的慢流形和卡纳轨道的可靠近似值。我们的计算方法随后被用来研究完整霍奇金-赫胥黎模型的鞍状慢流形和相关卡纳轨道在组织 MMO 和决定动作电位发射率中的作用。当ε足够大时,卡纳轨道被排列成具有相同数量SAO的孪生卡纳轨道对。我们说明了孪生卡纳轨道如何将吸引的慢流形分割成若干带状区域,这些带状区域起着旋转扇区的作用。其结果是,我们无需缩小模型就能解开慢流形和相关卡纳轨道的几何结构。
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Journal of Mathematical Neuroscience
Journal of Mathematical Neuroscience Neuroscience-Neuroscience (miscellaneous)
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审稿时长
13 weeks
期刊介绍: The Journal of Mathematical Neuroscience (JMN) publishes research articles on the mathematical modeling and analysis of all areas of neuroscience, i.e., the study of the nervous system and its dysfunctions. The focus is on using mathematics as the primary tool for elucidating the fundamental mechanisms responsible for experimentally observed behaviours in neuroscience at all relevant scales, from the molecular world to that of cognition. The aim is to publish work that uses advanced mathematical techniques to illuminate these questions. It publishes full length original papers, rapid communications and review articles. Papers that combine theoretical results supported by convincing numerical experiments are especially encouraged. Papers that introduce and help develop those new pieces of mathematical theory which are likely to be relevant to future studies of the nervous system in general and the human brain in particular are also welcome.
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