Bifurcation Analysis of Reduced Network Model of Coupled Gaussian Maps for Associative Memory

Mio Kobayashi, T. Yoshinaga
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引用次数: 0

Abstract

This paper proposes an associative memory model based on a coupled system of Gaussian maps. A one-dimensional Gaussian map describes a discrete-time dynamical system, and the coupled system of Gaussian maps can generate various phenomena including asymmetric fixed and periodic points. The Gaussian associative memory can effectively recall one of the stored patterns, which were triggered by an input pattern by associating the asymmetric two-periodic points observed in the coupled system with the binary values of output patterns. To investigate the Gaussian associative memory model, we formed its reduced model and analyzed the bifurcation structure. Pseudo-patterns were observed for the proposed model along with other conventional associative memory models, and the obtained patterns were related to the high-order or quasi-periodic points and the chaotic trajectories. In this paper, the structure of the Gaussian associative memory and its reduced models are introduced as well as the results of the bifurcation analysis are presented. Furthermore, the output sequences obtained from simulation of the recalling process are presented. We discuss the mechanism and the characteristics of the Gaussian associative memory based on the results of the analysis and the simulations conducted.
联想记忆耦合高斯映射简化网络模型的分岔分析
提出了一种基于高斯映射耦合系统的联想记忆模型。一维高斯映射描述了一个离散时间动力系统,高斯映射的耦合系统可以产生不对称的固定点和周期点等各种现象。高斯联想记忆通过将耦合系统中观察到的非对称双周期点与输出模式的二进制值相关联,可以有效地回忆起输入模式触发的存储模式。为了研究高斯联想记忆模型,我们建立了它的简化模型,并对其分岔结构进行了分析。该模型与其他传统的联想记忆模型一起观察到伪模式,所得到的模式与高阶或准周期点和混沌轨迹有关。本文介绍了高斯联想记忆的结构及其简化模型,并给出了分岔分析的结果。在此基础上,给出了回收过程仿真的输出序列。在分析和仿真的基础上,讨论了高斯联想记忆的机理和特点。
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