Multistability and New Attraction Basins of Almost-Periodic Solutions of Delayed Neural Networks

Author

Lili Wang ; Wenlian Lu ; Tianping Chen

Author_Institution

Shanghai Key Lab. for Contemporary Appl. Math., Fudan Univ., Shanghai, China

Volume

20

Issue

10

fYear

2009

Firstpage

1581

Lastpage

1593

Abstract

In this paper, we investigate multistability of almost-periodic solutions of recurrently connected neural networks with delays (simply called delayed neural networks). We will reveal that under some conditions, the space Rn can be divided into 2n subsets, and in each subset, the delayed n -neuron neural network has a locally stable almost-periodic solution. Furthermore, we also investigate the attraction basins of these almost-periodic solutions. We reveal that the attraction basin of almost-periodic trajectory is larger than the subset, where the corresponding almost-periodic trajectory is located. In addition, several numerical simulations are presented to corroborate the theoretical results.

Keywords

delays; recurrent neural nets; set theory; stability; almost-periodic multistability solution; attraction basin; delayed recurrent connected neural network; subsets; Associative memory; Computer networks; Concurrent computing; Educational programs; Mathematics; Neural networks; Numerical simulation; Recurrent neural networks; Stability; Technological innovation; Almost-periodic solution; attraction basin; delay; multistability; neural networks; Algorithms; Computer Simulation; Models, Theoretical; Neural Networks (Computer); Oscillometry; Periodicity; Signal Processing, Computer-Assisted;

fLanguage

English

Journal_Title

Neural Networks, IEEE Transactions on

Publisher

ieee

ISSN

1045-9227

Type

jour

DOI

10.1109/TNN.2009.2027121

Filename

5223533