Impulsive Neutral Integrodifferential Equations on Unbounded Intervals
Copyright policy )Impulsive Neutral Integrodifferential Equations on Unbounded Intervals
The authors investigate the existence of solutions of a class of impulsive neutral integro-differential equations in unbounded intervals. The main results are obtained by using the fixed-point theorem by Schaefer and recent results on compactness of a continuous operator on the Banach space of bounded continuous function from a topological space into \(\mathbb R^n\).
- University of Calabria Italy
impulsive nonlinear neutral integrodifferential equations, boundary value problem, compactness, Schaefer's fixed point theorem, Ordinary differential equations with impulses, Compactness in topological linear spaces; angelic spaces, etc., unbounded interval
impulsive nonlinear neutral integrodifferential equations, boundary value problem, compactness, Schaefer's fixed point theorem, Ordinary differential equations with impulses, Compactness in topological linear spaces; angelic spaces, etc., unbounded interval
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