Lyapunov approach for stability of integro-differential equations with non instantaneous impulse effect

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DOI:

https://doi.org/10.26637/mjm401/015

Abstract

  In this paper an integro-differential system of equations, with fixed moments of non instantaneous impulse effects is considered. Sufficient conditions for stability and asymptotic stability of this system have been worked out. The investigations are carried out by means of piecewise continuous functions, analogous to Lyapunov functions and by means of the theory of differential inequalities for such functions. A new comparison lemma, connecting the solution of the given impulsive integro-differential system to the solution of a scalar impulsive differential system is also established.

Keywords:

Impulsive integro-differential systems, non instantaneous impulses, Lyapunov stability, asymptotic stability, Lyapunov function

Mathematics Subject Classification:

34C20, 34D20, 34A37, 34K4, 92D25
  • Anju Sood Department Applied Sciences, Discipline: Mathematics, Punjab Technical University, Kapurthala-144601, India.
  • Sanjay K. Srivastava Department Applied Sciences, Discipline: Mathematics, Beant College of Engineering and Technology, Gurdaspur-143521, India.
  • Pages: 119-125
  • Date Published: 01-01-2016
  • Vol. 4 No. 01 (2016): Malaya Journal of Matematik (MJM)

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Published

01-01-2016

How to Cite

Anju Sood, and Sanjay K. Srivastava. “Lyapunov Approach for Stability of Integro-Differential Equations With Non Instantaneous Impulse Effect”. Malaya Journal of Matematik, vol. 4, no. 01, Jan. 2016, pp. 119-25, doi:10.26637/mjm401/015.