DocumentCode
1837237
Title
Cellular neural networks and zeta functions
Author
Jung-Chao Ban ; Wen-Guei Hu ; Song-Sun Lin ; Yin-Heng Lin
Author_Institution
Dept. of Appl. Math., Nat. Dong Hwa Univ., Hualian, Taiwan
fYear
2010
fDate
3-5 Feb. 2010
Firstpage
1
Lastpage
4
Abstract
This talk is concerned with zeta functions of two-dimensional shifts of finite type. The zeta function is an important invariant, which combines information of all periodic patterns. The zeta function can be explicitly expressed as a reciprocal of an infinite product of polynomials by patterns generation approaches. The methods can apply to two-dimensional cellular neural networks.
Keywords
cellular neural nets; functions; polynomials; cellular neural networks; patterns generation approaches; zeta functions; Cellular networks; Cellular neural networks; Eigenvalues and eigenfunctions; Entropy; Geometry; Lattices; Mathematics; Physics; Polynomials;
fLanguage
English
Publisher
ieee
Conference_Titel
Cellular Nanoscale Networks and Their Applications (CNNA), 2010 12th International Workshop on
Conference_Location
Berkeley, CA
Print_ISBN
978-1-4244-6679-5
Type
conf
DOI
10.1109/CNNA.2010.5430260
Filename
5430260
Link To Document