Oscillation of solutions of a neutral pantograph equation with impulsive perturbations

KAIZHONG GUAN

Oscillation of solutions of a neutral pantograph equation with impulsive perturbations

Authors: KAIZHONG GUAN

Abstract: Some sufficient conditions are established on the oscillation of all solutions of a class of neutral pantograph equations with impulsive perturbations of the form \{\begin{array}{l}\frac{d}{dt}[x(t)-C(t)x(\gamma t)]+ \frac{P(t)}{t}x(\alpha t)-\frac{Q(t)}{t}x(\beta t)=0,~~ t\geq t_{0}>0,~~ t\neq t_{k}, x(t^{+}_{k})=b_{k}x(t_{k}), k=1,2,... . \end{array}\right.

Keywords: Oscillation, neutral differential equation, pantograph equation, impulses

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