Nonnegative periodicity on high-order proportional delayed cellular neural networks involving $ D $ operator

This paper aims to deal with the dynamic behaviors of nonnegative periodic solutions for one kind of high-order proportional delayed cellular neural networks involving $ D $ operator. By utilizing Lyapunov functional approach, combined with some dynamic inequalities, we establish a new assertion to...

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Bibliographic Details
Published in	AIMS mathematics Vol. 6; no. 3; pp. 2228 - 2243
Main Authors	Guo, Xiaojin, Huang, Chuangxia, Cao, Jinde
Format	Journal Article
Language	English
Published	AIMS Press 01.01.2021
Subjects	d operator global exponential stability high-order cellular neural network nonnegative periodic solution proportional delay
Online Access	Get full text
ISSN	2473-6988 2473-6988
DOI	10.3934/math.2021135

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Summary:	This paper aims to deal with the dynamic behaviors of nonnegative periodic solutions for one kind of high-order proportional delayed cellular neural networks involving $ D $ operator. By utilizing Lyapunov functional approach, combined with some dynamic inequalities, we establish a new assertion to guarantee the existence and global exponential stability of nonnegative periodic solutions for the addressed networks. The obtained results supplement and improve some existing ones. In addition, the correctness of the analytical results are verified by numerical simulations.
ISSN:	2473-6988 2473-6988
DOI:	10.3934/math.2021135