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Journal of Dynamical and Control Systems

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11-10-2014

Approximate Controllability for a Semilinear Evolution System with Infinite Delay

Authors: Fatima Zahra Mokkedem, Xianlong Fu

Published in: Journal of Dynamical and Control Systems | Issue 1/2016

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Abstract

In this work, we study the approximate controllability for a class of control systems governed by semilinear equations with infinite delay in Hilbert spaces. Sufficient conditions for approximate controllability are established by constructing fundamental solution and using resolvent condition and techniques on fractional power operators. As an illustration of the application of the obtained results, an example is also provided.

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Adimy M, Bouzahir H, Ezzinbi K. Local existence and stability for some partial functional differential equations with infinite delay. Nonl Anal Theory Metho Appl. 2002;48:323–348.CrossRefMathSciNetMATH

Adimy M, Ezzinbi K, Ouhinou A. Variation of constants formula and almost periodic solutions for some partial functional differential equations with infinite delay. J Math Anal Appl. 2006;317:668–689.CrossRefMathSciNetMATH

Bashirov AE, Mahmudov NI. On concepts of controllability for linear deterministic and stochastic systems. SIAM J Control Optim. 1999;37:1808–1821.CrossRefMathSciNetMATH

Curtain R, Zwart HJ. An introduction to infinite dimensional linear systems theory. New York: Springer; 1995.CrossRefMATH

Dong Q, Li G. Existence of solutions for nonlinear evolution equations with infinite delay. Bull Korean Math Soc. 2014;51:43–54.CrossRefMathSciNetMATH

Engel KJ, Nagel R. One-parameter semigroups for linear evolution equations. New York: Springer; 2000.MATH

Fu X. Approximate controllability of semilinear neutral retarded systems. IMA J Math Control Info. 2013:1–22.

Guendouzi T. Existence and controllability of fractional-order impulsive stochastic system with infinite delay. Disc Math Diff Incl Control Optim. 2013;33:65–87.CrossRefMathSciNetMATH

Hale J, Kato J. Phase space for retarded equations with infinite delay. Funk Ekvac. 1978;21:11–41.MathSciNetMATH

10.

Henriquez HR. Periodic solutions of quasi-linear partial functional differential equations with unbounded delay. Funkcial Ekvac. 1994;37:329–343.MathSciNetMATH

11.

Henriquez HR. Regularity of solutions of abstract retarded functional differential equations with unbounded delay. Nonl Anal TMA. 1997;28: 513–531.CrossRefMathSciNetMATH

12.

Hino Y, Murakami S, Naito T. Functional differential equations with infinite delay. Berlin: Springer; 1991.MATH

13.

Jeong J, Kwun Y, Park J. Approximate controllability for semilinear retarded functional differential equations. J Dyn Control Syst. 1999;5:329–346.CrossRefMathSciNetMATH

14.

Jeong J, Roh H. Approximate controllability for semilinear retarded systems. J Math Anal Appl. 2006;321:961–975.CrossRefMathSciNetMATH

15.

Lunardi A. On the linear heat equation with fading memory. SIAM J Math Anal. 1990;21:1213–24.CrossRefMathSciNetMATH

16.

Muthukumar P, Balasubramaniam P. Approximate controllability for semi-linear retarded stochastic systems in Hilbert spaces. IMA J Math Control Info. 2009;26:131–140.CrossRefMathSciNetMATH

17.

Naito K. Controllability of semilinear control systems dominated by the linear part. SIAM J Control Optim. 1987;25:715–722.CrossRefMathSciNetMATH

18.

Nunziato JW. On heat conduction in materials with memory. Quart Appl Math. 1971;29:187–304.MathSciNetMATH

19.

Pazy A. Semigroups of linear operators and applications to partial differential equations. New York: Springer; 1983.CrossRefMATH

20.

Sakthivel R, Nieto JJ, Mahmudov NI. Approximate controllability of nonlinear deterministic and stochastic systems with unbounded delay. Taiwanese J Math. 2010;14:1777–97.MathSciNetMATH

21.

Sakthivel R, Suganya S, Anthoni SM. Approximate controllability of fractional stochastic evolution equations. Compu Math Appl. 2012;63:660–8.CrossRefMathSciNetMATH

22.

Shen L, Sun J. Approximate controllability of stochastic impulsive functional systems with infinite delay. Automatica. 2012;48:2705–09.CrossRefMathSciNetMATH

23.

Shin JS. On the uniqueness of solutions for functional differential equations with infinite delay. Funkcial Ekvac. 1987;30:225–236.MathSciNetMATH

24.

Travis CC, Webb GF. Existence and stability for partial functional differential equations. Trans Amer Math Soc. 1974;200:395–418.CrossRefMathSciNetMATH

25.

Wu J. Theory and applications of partial functional differential equations. New York : Springer; 1996.CrossRefMATH

26.

Wang L. Approximate controllability for integrodifferential equations with multiple delays. J Optim Theory Appl. 2009;143:185–206.CrossRefMathSciNetMATH

27.

Wang L. Approximate controllability results of semilinear integrodifferential equations with infinite delays. Sci China Ser F-Inf Sci. 2009;52:1095–1102.CrossRefMATH

Title: Approximate Controllability for a Semilinear Evolution System with Infinite Delay
Authors: Fatima Zahra Mokkedem
Xianlong Fu
Publication date: 11-10-2014
Publisher: Springer US
Published in: Journal of Dynamical and Control Systems / Issue 1/2016
Print ISSN: 1079-2724
Electronic ISSN: 1573-8698
DOI: https://doi.org/10.1007/s10883-014-9252-5

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