DocumentCode
2969584
Title
Recurrent neural networks and Fibonacci numeration system
Author
Yacoub, M. ; Saoudi, A.
Author_Institution
Inst. Galilee, Univ. de Paris-Nord, Villetaneuse, France
Volume
3
fYear
1993
fDate
25-29 Oct. 1993
Firstpage
2331
Abstract
It is known from Zeckendorf´s theorem (1972) that every positive integer admits a representation as a sum of distinct Fibonacci numbers. Furthermore, this representation is unique if it does not contain two consecutive digits that equal to 1 and has no zero to its left hand side. This unique representation is called normal form. Recurrent neural networks have shown to have powerful capabilities for modeling many computational structures. In the present paper we show how to compute normalization and addition in Fibonacci numeration system using recurrent neural networks.
Keywords
mathematics computing; number theory; numerical analysis; recurrent neural nets; Fibonacci numeration system; Zeckendorf theorem; addition; normal form; normalization; recurrent neural networks; Computational modeling; Computer architecture; Computer networks; Computer science; Neural networks; Power system modeling; Recurrent neural networks;
fLanguage
English
Publisher
ieee
Conference_Titel
Neural Networks, 1993. IJCNN '93-Nagoya. Proceedings of 1993 International Joint Conference on
Print_ISBN
0-7803-1421-2
Type
conf
DOI
10.1109/IJCNN.1993.714192
Filename
714192
Link To Document