ABSTRACT
Complex, Hypercomplex, and Fuzzy-Valued Neural Networks are extensions of classical neural networks to higher dimensions. In recent decades, this theory has emerged as a forefront in neural networks theory. There are several approaches to extend classical neural network models: quaternionic analysis, which merely uses quaternions; Clifford analysis, which relies on Clifford algebras; and finally generalizations of complex variables to higher dimensions. This book reflects a selection of papers related to complex, hypercomplex analysis, and fuzzy approaches applied to neural networks theory. The topics covered represent new perspectives and current trends in neural networks and their applications to mathematical physics, image analysis and processing, mechanics, and beyond.
TABLE OF CONTENTS
part I|56 pages
Real-Valued Neural Networks
part II|38 pages
Complex- and Quaternionic-valued Neural Networks and Their Applications
chapter Chapter 4|8 pages
Theoretical Foundation of Complex- and Quaternionic-valued Neural Networks
chapter Chapter 5|10 pages
Chaos Game Representation of DNA and Hypercomplex Neural Networks Classification
chapter Chapter 6|18 pages
Comparative Analysis of Hypercomplex and Real-Valued CNNs for Melanoma Detection: A Study on Batch Sizes
part III|52 pages
Theoretical Foundation of Computation with Neural Networks, from Classic to Fuzzy
