Stability by fixed point theory of impulsive differential equations with delay | Zendy

Halimi Berrezoug | Zendy; Jorge Losada | Zendy; Juan J. Nieto | Zendy; Abdelghani Ouahab | Zendy

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Stability by fixed point theory of impulsive differential equations with delay

Author(s) -

Halimi Berrezoug,

Jorge Losada,

Juan J. Nieto,

Abdelghani Ouahab

Publication year - 2019

Publication title -

annals of west university of timisoara - mathematics and computer science

Language(s) - English

Resource type - Journals

eISSN - 1841-3307

pISSN - 1841-3293

DOI - 10.2478/awutm-2019-0012

Subject(s) - stability theory , fixed point , class (philosophy) , mathematics , differential equation , stability (learning theory) , fixed point theorem , delay differential equation , zero (linguistics) , mathematical analysis , differential (mechanical device) , control theory (sociology) , equilibrium point , point (geometry) , computer science , physics , nonlinear system , control (management) , geometry , philosophy , thermodynamics , machine learning , linguistics , artificial intelligence , quantum mechanics

In this paper we ensure that for some class of impulsive differential equations with delay the zero solution is asymptotically stable by means of fixed point theory.

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