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Keywords:
functional differential equation; oscillatory; nonoscillatory; canonical form; property (A)
functional differential equation; oscillatory; nonoscillatory; canonical form; property (A)
Summary:
In this paper the oscillatory and asymptotic properties of the solutions of the functional differential equation $L_nu(t)+p(t)f(u[g(t)])=0$ are compared with those of the functional differential equation $\alpha_nu(t)+q(t)h(u[w(t)])=0$.
References:
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