Series of Semihypergroups of Time-Varying Artificial Neurons and Related Hyperstructures
作者: Jan Chvalina , Bedřich Smetana
DOI: 10.3390/SYM11070927
关键词: Function (mathematics) 、 Pure mathematics 、 Group (mathematics) 、 Series (mathematics) 、 Multilayer perceptron 、 Mathematics 、 Differential operator
摘要: Detailed analysis of the function multilayer perceptron (MLP) and its neurons together with use time-varying allowed authors to find an analogy structures linear differential operators. This procedure construction a group hypergroup artificial neurons. In this article, focusing on semihyperstructures using above described procedure, bring new insights into hyperstructures their possible symmetric relations.
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M. Novák, Some basic properties of EL-hyperstructures The Journal of Combinatorics. ,vol. 34, pp. 446- 459 ,(2013) , 10.1016/J.EJC.2012.09.005
Timo Koskela, Neural network methods in analysing and modelling time varying processes Helsinki University of Technology. ,(2003)
Violeta Leoreanu, Piergiulio Corsini, Applications of Hyperstructure Theory ,(2010)
Christopher M. Bishop, Neural networks for pattern recognition ,(1995)
Sven Behnke, Hierarchical Neural Networks for Image Interpretation ,(2003)
Howard B. Demuth, Martin T. Hagan, Mark Beale, Neural network design ,(1995)
Irina Cristea, Mirela Ştefănescu, Hypergroups and n-ary relations The Journal of Combinatorics. ,vol. 31, pp. 780- 789 ,(2010) , 10.1016/J.EJC.2009.07.005
M.W Gardner, S.R Dorling, Artificial neural networks (the multilayer perceptron)—a review of applications in the atmospheric sciences Atmospheric Environment. ,vol. 32, pp. 2627- 2636 ,(1998) , 10.1016/S1352-2310(97)00447-0
M.B. Waldron, Time varying neural networks international conference of the ieee engineering in medicine and biology society. pp. 1933- ,(1988) , 10.1109/IEMBS.1988.95243
Zamir Bavel, The source as a tool in automata Information & Computation. ,vol. 18, pp. 140- 155 ,(1971) , 10.1016/S0019-9958(71)90324-X