分形几何学与计算智能:未来展望。

Q3 Neuroscience
Lorenzo Livi, Alireza Sadeghian, Antonio Di Ieva
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引用次数: 0

摘要

分形的特征通常用于具有复杂和多尺度描述的系统。人脑就是这类系统的一个突出例子,它可以被理想化为一个由许多相互作用的子单元组成的复杂动力系统。人脑可以用可观测变量及其时空功能关系来建模。计算智能是一个研究领域,它融合了许多受自然启发的计算方法,如人工神经网络、模糊系统以及进化和群集智能优化技术。计算智能方法面临的典型问题包括分类和预测等识别问题。虽然从历史上看,这类方法是在某种向量空间中运行的,但最近已扩展到所谓的非几何空间,并将标记图视为这类模式的最一般示例。在此,我们建议在神经科学研究中结合使用分形分析和计算智能方法。分形特征可用于:(i) 评估尺度不变特性;(ii) 提供基于特征的数字表征,以补充神经科学中通常较为复杂的模式结构。计算智能方法可用于利用这种分形特征,同时考虑对非几何输入空间进行数据驱动分析的可能性,从而克服与欧几里得几何相关的内在限制。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Fractal Geometry Meets Computational Intelligence: Future Perspectives.

Characterizations in terms of fractals are typically employed for systems with complex and multiscale descriptions. A prominent example of such systems is provided by the human brain, which can be idealized as a complex dynamical system made of many interacting subunits. The human brain can be modeled in terms of observable variables together with their spatio-temporal-functional relations. Computational intelligence is a research field bridging many nature-inspired computational methods, such as artificial neural networks, fuzzy systems, and evolutionary and swarm intelligence optimization techniques. Typical problems faced by means of computational intelligence methods include those of recognition, such as classification and prediction. Although historically conceived to operate in some vector space, such methods have been recently extended to the so-called nongeometric spaces, considering labeled graphs as the most general example of such patterns. Here, we suggest that fractal analysis and computational intelligence methods can be exploited together in neuroscience research. Fractal characterizations can be used to (i) assess scale-invariant properties and (ii) offer numeric, feature-based representations to complement the usually more complex pattern structures encountered in neurosciences. Computational intelligence methods could be used to exploit such fractal characterizations, considering also the possibility to perform data-driven analysis of nongeometric input spaces, therby overcoming the intrinsic limits related to Euclidean geometry.

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来源期刊
Advances in neurobiology
Advances in neurobiology Neuroscience-Neurology
CiteScore
2.80
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