DocumentCode
1315239
Title
Multiperiodicity of Periodically Oscillated Discrete-Time Neural Networks With Transient Excitatory Self-Connections and Sigmoidal Nonlinearities
Author
Huang, Zhenkun ; Wang, Xinghua ; Feng, Chunhua
Author_Institution
Sch. of Sci., Jimei Univ., Xiamen, China
Volume
21
Issue
10
fYear
2010
Firstpage
1643
Lastpage
1655
Abstract
The existing approaches to the multistability and multiperiodicity of neural networks rely on the strictly excitatory self-interactions of neurons or require constant interconnection weights. For periodically oscillated discrete-time neural networks (DTNNs), it is difficult to discuss multistable dynamics when the connection weights are periodically oscillated around zero. By using transient excitatory self-interactions of neurons and sigmoidal nonlinearities, we develop an approach to investigate multiperiodicity and attractivity of periodically oscillated DTNNs with time-varying and distributed delays. It shows that, under some new criteria, there exist multiplicity results of periodic solutions which are locally or globally exponentially stable. Computer numerical simulations are performed to illustrate the new theories.
Keywords
delays; discrete time systems; neural nets; time-varying systems; DTNN; computer numerical simulations; discrete time neural networks multiperiodicity; distributed delays; interconnection weights; multistable dynamics; neurons; periodical oscillation; sigmoidal nonlinearities; transient excitatory self connections; Artificial neural networks; Associative memory; Delay; Neurons; Stability criteria; Transient analysis; Discrete time; excitatory self-interactions; multiperiodicity; neural networks; sigmoidal nonlinearities; Algorithms; Computer Simulation; Models, Theoretical; Neural Networks (Computer); Nonlinear Dynamics; Periodicity;
fLanguage
English
Journal_Title
Neural Networks, IEEE Transactions on
Publisher
ieee
ISSN
1045-9227
Type
jour
DOI
10.1109/TNN.2010.2067225
Filename
5565483
Link To Document