Exponential stability for singularly perturbed systems with state delays
V. Dragan, Institute of Mathematics of the Romanian Academy, Bucharest, Romania E. J. Qualitative Theory of Diff. Equ., Proc. 6'th Coll. Qualitative Theory of Diff. Equ., No. 6. (2000), pp. 1-8.
A. Ionita, Institute of Theoretical and Experimental Analisys of Aeronautical Structures, Bucharest, Romania
| Communicated by L. Hatvani. | Appeared on 2000-01-01 |
Abstract: In this paper the problem of stability of the zero solution of singularly perturbed system of linear differential equation with state delays is investigated. We show that if the zero solution of reduced subsystem and the one of the fast subsystem are exponentially stable, then the zero solution of the given singularly perturbed system of differential equations is also exponentially stable. Estimates of the block components of the fundamental matrix solution are derived. These estimates are used to obtain asymptotic expansions on unbounded interval for the solutions of this class of singularly perturbed systems.
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