Exceptional Reducibility of Complex-Valued Neural Networks

Exceptional Reducibility of Complex-Valued Neural Networks

A neural network is referred to as minimal if it cannot reduce the number of hidden neurons that maintain the input-output map. The condition in which the number of hidden neurons can be reduced is referred to as reducibility. Real-valued neural networks have only three simple types of reducibility....

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Veröffentlicht in:IEEE transaction on neural networks and learning systems 2010-07, Vol.21 (7), p.1060-1072
1. Verfasser: Kobayashi, Masaki
Format: Artikel
Sprache:eng
Schlagworte:
Algorithms
Applied sciences
Artificial intelligence
Complex-valued neural networks
Computer science
control theory
systems
Connectionism. Neural networks
Convergence
Exact sciences and technology
Feedforward neural networks
Feedforward systems
Humans
Maintenance engineering
minimality
Neural networks
Neural Networks (Computer)
Neurons
Neurons - physiology
reducibility
rotation-equivalence
Signal Processing, Computer-Assisted
Sufficient conditions
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Beschreibung
Zusammenfassung:A neural network is referred to as minimal if it cannot reduce the number of hidden neurons that maintain the input-output map. The condition in which the number of hidden neurons can be reduced is referred to as reducibility. Real-valued neural networks have only three simple types of reducibility. It can be naturally extended to complex-valued neural networks without bias terms of hidden neurons. However, general complex-valued neural networks have another type of reducibility, referred to herein as exceptional reducibility. In this paper, another type of reducibility is presented, and a method by which to minimize complex-valued neural networks is proposed.
ISSN:1045-9227
2162-237X
1941-0093
2162-2388
DOI:10.1109/TNN.2010.2048040