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Asymptotic stability of systems with impulses by the direct method of Lyapunov

Published online by Cambridge University Press:  17 April 2009

G.K. Kulev  and
D.D. Bainov
G.K. Kulev
Affiliation:
Plovdiv University, “Plissii Hilendarski”, Bulgaria
D.D. Bainov
Affiliation:
Plovdiv University, “Plissii Hilendarski”, Bulgaria
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Abstract

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In the present paper the asymptotic and globally asymptotic stability of the zero solution of systems with impulses are investigated. For this purpose piecewise continuous auxiliary functions are used which are analogous to Lyapunov's functions. The theorem of Marachkov on the asymptotic stability of systems without impulses is generalised. The results obtained are formulated in four theorems.

Type
Research Article
Information
Bulletin of the Australian Mathematical Society , Volume 38 , Issue 1 , August 1988 , pp. 113 - 123
Copyright
Copyright © Australian Mathematical Society 1988

References

[1]Dishliev, A.B. and Bainov, D.D., ‘Sufficient conditions for absence of “beating” in systems of differential equations with impulses’, Applicable Annal. 18 (1985), 6773.CrossRefGoogle Scholar
[2]Dishliev, A.B. and Bainov, D.D., ‘Conditions for the absence of the phenomenon “beating” for systems of impulse differential equations’, Institute of Mathematics, Academia Sinica 13 (1985), 237256.Google Scholar
[3]Leela, S., ‘Stability of measure differential equations’, Pacific J. Math. 55 (1977), 489498.CrossRefGoogle Scholar
[4]Leela, S., ‘Stability of differential systems with impulsive perturbations in terms of two measures’, Nonlinear Anal. 1 (1977), 667677.CrossRefGoogle Scholar
[5]Marachkov, M., ‘On a theorem on stability’, Bull. Soc. Phys. Math. Kazan 12 (1940), 171174. (in Russian)Google Scholar
[6]Myshkis, A.D. and Samoilenko, A.M., ‘Systems with impulses in prescribed moments of the time’, Mat. Sb. 74 (1967), 202208. (in Russian).Google Scholar
[7]Pandit, S.G., ‘On the stability of impulsively perturbed differential systems’, Bull. Austral. Math. Soc. 17 (1977), 423432.CrossRefGoogle Scholar
[8]Pavlidis, T., ‘Stability of systems described by differential equations containing impulses’, IEEE Trans. Automat. Control 2 (1967), 4345.CrossRefGoogle Scholar
[9]Mohaima Rao, M. Rama and Han Rao, V. Sree, ‘Stability of impulsively perturbed systems’, Bull. Austral. Math. Soc. 16 (1977), 99110.CrossRefGoogle Scholar
[10]Samoilenko, A.M. and Perestjuk, N.A., ‘Stability of the solutions of differential equations with impulse effect’, Differentsial'niye Uravneniya 11 (1977), 19811992. (in Russian)Google Scholar
[11]Simeonov, P.S. and Bainov, D.D., ‘The second method of Liapunov for systems with impulse effect’, Tamkang J. Math. 16 (1985), 1940.Google Scholar
[12]Simeonov, P.S. and Bainov, D.D., ‘Stability with respect to part of the variables in systems with impulse effect’, J. Math. Anal. Appl. 117 (1986), 247263.CrossRefGoogle Scholar