Improved Stability Estimates for Impulsive Delay Reaction-Diffusion Cohen-Grossberg Neural Networks Via Hardy-Poincaré Inequality

An impulsive Cohen-Grossberg neural network with time-varying and S-type distributed delays and reaction-diffusion terms is considered. By using Hardy-Poincaré inequality instead of Hardy-Sobolev inequality or just the nonpositivity of the reaction-diffusion operators, under suitable conditions in terms of M-matrices which involve the reaction-diffusion coefficients and the dimension and size of the spatial domain, improved stability estimates for the system with zero Dirichlet boundary conditions are obtained. Examples are given.

Idioma:: Inglés

Calendario de la edición:: 3 veces al año
Temas de la revista:: Matemáticas, Matemáticas generales

RSS Feed de revista

Improved Stability Estimates for Impulsive Delay Reaction-Diffusion Cohen-Grossberg Neural Networks Via Hardy-Poincaré Inequality

Haydar Akça

Valéry Covachev

Zlatinka Covacheva

Publicado en línea: 04 jul 2013

Páginas: 1 - 18

DOI: https://doi.org/10.2478/tmmp-2013-0001

Palabras claveCohen-Grossberg neural networks, S-type delays, impulses, reaction-diffusion, Hardy-Poincaré inequalit

This content is open access.

Palabras clave
Cohen-Grossberg neural networks, S-type delays, impulses, reaction-diffusion, Hardy-Poincaré inequalit