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将神经网络简化为离散动力学。

Reducing Neuronal Networks to Discrete Dynamics.

作者信息

Terman David, Ahn Sungwoo, Wang Xueying, Just Winfried

机构信息

Department of Mathematics and the Mathematical Biosciences Institute, Ohio State University, Columbus, OH 43210.

出版信息

Physica D. 2008 Mar;237(3):324-338. doi: 10.1016/j.physd.2007.09.011.

DOI:10.1016/j.physd.2007.09.011
PMID:18443649
原文链接:https://pmc.ncbi.nlm.nih.gov/articles/PMC2350233/
Abstract

We consider a general class of purely inhibitory and excitatory-inhibitory neuronal networks, with a general class of network architectures, and characterize the complex firing patterns that emerge. Our strategy for studying these networks is to first reduce them to a discrete model. In the discrete model, each neuron is represented as a finite number of states and there are rules for how a neuron transitions from one state to another. In this paper, we rigorously demonstrate that the continuous neuronal model can be reduced to the discrete model if the intrinsic and synaptic properties of the cells are chosen appropriately. In a companion paper [1], we analyze the discrete model.

摘要

我们考虑一类具有一般网络架构的纯抑制性和兴奋-抑制性神经元网络,并刻画所出现的复杂放电模式。我们研究这些网络的策略是首先将它们简化为一个离散模型。在离散模型中,每个神经元由有限数量的状态表示,并且存在关于神经元如何从一个状态转变为另一个状态的规则。在本文中,我们严格证明,如果细胞的内在特性和突触特性选择得当,连续神经元模型可以简化为离散模型。在一篇配套论文[1]中,我们分析离散模型。

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