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In this paper, a theory of multiple-valued threshold functions over the field of complex numbers is further developed. k-valued threshold functions over the field of complex numbers can be learned using a single multi-valued neuron (MVN). We propose a new approach for the projection of a k-valued function, which is not a threshold one, to m-valued logic (m≫k), where this function becomes a partially defined m-valued threshold function and can be learned by a single MVN. To build this projection, a periodic activation function for the MVN is used. This new activation function and a modified learning algorithm make it possible to learn nonlinearly separable multiple-valued functions using a single MVN.
Published in:
Multiple-Valued Logic (ISMVL), 2010 40th IEEE International Symposium on
Date of Conference: 26-28 May 2010
- Page(s):
- 33 - 38
- ISSN :
- 0195-623X
- Print ISBN:
- 978-1-4244-6752-5
- Conference Location :
- Barcelona, Spain
- Digital Object Identifier :
- 10.1109/ISMVL.2010.15
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