递归神经网络动态模型的全局分岔

Pub Date : 2022-11-18 DOI:10.21136/AM.2022.0158-21
Anita Windisch, Péter L. Simon
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引用次数: 0

摘要

研究了具有特殊权重矩阵的连续时间递归神经网络模型的动力学行为。该网络包含几个相同的兴奋性神经元和一个抑制性神经元。这种特殊的构造使我们能够降低系统的维数,然后充分刻画局部和全局余维一分岔。结果表明,除了鞍节分叉和Andronov-Hopf分叉外,还可能出现同宿分叉和循环折叠分叉。这些分叉曲线将权重参数的平面划分为九个域。还对属于这些领域的相位肖像进行了表征。
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Global bifurcations in a dynamical model of recurrent neural networks

The dynamical behaviour of a continuous time recurrent neural network model with a special weight matrix is studied. The network contains several identical excitatory neurons and a single inhibitory one. This special construction enables us to reduce the dimension of the system and then fully characterize the local and global codimension-one bifurcations. It is shown that besides saddle-node and Andronov-Hopf bifurcations, homoclinic and cycle fold bifurcations may occur. These bifurcation curves divide the plane of weight parameters into nine domains. The phase portraits belonging to these domains are also characterized.

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