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Stamov, Gani Tr.

Impulsive cellular neural networks and almost periodicity. (English) Zbl 1078.34511

Proc. Japan Acad., Ser. A 80, No. 10, 198-203 (2004).
The author pretends to study impulsive cellular neural networks. His system under consideration is not a system describing cellular neural networks. There are so many papers concerning the study of cellular neural networks and no one is cited by the author. The author should make a difference between impulsive neural networks and cellular neural networks. Obviously, the results obtained in the paper concern only impulsive Hopfield neural networks and almost-periodicity in such.
Reviewer: Angela Slavova (Sofia)

Cited in 21 Documents

MSC:

34A37 Ordinary differential equations with impulses
92B20 Neural networks for/in biological studies, artificial life and related topics
34D23 Global stability of solutions to ordinary differential equations

Keywords:

Hopfield neural network; almost periodicity; impulsive systems
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\textit{G. Tr. Stamov}, Proc. Japan Acad., Ser. A 80, No. 10, 198--203 (2004; Zbl 1078.34511)
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References:

[1] Fink, A. M.: Almost Periodic Differential Equations. Springer, Berlin (1974). · Zbl 0325.34039
[2] Samoilenko, A. M., and Perestyuk, N. A.: Differential Equations with Impulse Effect. Visca Skola, Kiev (1987), (in Russian).
[3] Stamov, G. T.: Almost periodic solutions for forced perturbed impulsive differential equations. Appl. Anal., 74 (1-2), 45-56 (2000). · Zbl 1031.34005
[4] Stamov, G. T.: Existence of almost periodic solutions for impulsive differential equations with perturbations of the linear part. Nonlinear Stud., 9 (3), 263-272 (2002). · Zbl 1017.34051
[5] Stamov, G. T.: Separated and almost periodic solutions for impulsive differential equations. Note Mat., 20 (2), 105-113 (2000/2001). · Zbl 1223.34013
[6] Stamov, G. T.: Lyapunov’s functions for existence of almost periodic solutions of impulsive differential equations. Adv. Studies in Contenmporary Math, 74 (1-2), 45-56 (2004). · Zbl 1053.34008
[7] Bainov, D. D., Myshkis, A. D., and Stamov, G. T.: Dichotomies and almost periodicity of the solutions of systems of impulsive differential equations. Dynam. Systems Appl., 5 , 145-152 (1996). · Zbl 0848.34029
[8] Bainov, D. D., Dishliev, A. B., and Stamov, G. T.: Almost periodic solutions of hiperbolic systems of impulsive differential equations. Kumamoto J. Math., 10 , 1-10 (1997). · Zbl 0873.34008
[9] Bainov, D., and Simeonov, P.: Systems with Impulse Effect: Stability, Theory and Applications. Ellis Horwood, Chichester (1989). · Zbl 0683.34032
[10] Bainov, D. D., and Simeonov, P. S.: Theory of Impulsive Differential Equations: Periodic Solutions and Applications. Longman, Harlow (1993). · Zbl 0815.34001
[11] Hopfield, J. J.: Neurons with graded response have collective computational properties like those of two-stage neurons. Proc. Nat. Acad. Sci. USA, 81 , 3088-3092 (1984). · Zbl 1371.92015
[12] Lakshmikantham, V., Bainov, D. D., and Simeonov, P. S.: Theory of Impulsive Differential Equations. World Scientific, Singapore (1989). · Zbl 0719.34002
[13] Mil’man, V. D., and Myshkis, A. D.: On the Stability of Motion in the Precence of Impulses. Siberian Math. J., 1 , 233-237 (1960), (in Russian).
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