Abstract :
The even order neutral differential equation
dn
dtn
x(t) + h(t)x(t − τ)
+ f
t,x
g(t)
=0 (1)
is considered under the following conditions: n 2 is even; τ > 0; h ∈ C(R); g ∈
C[t0,∞), limt→∞g(t)=∞; f ∈ C([t0,∞) × R), uf (t , u) 0 for (t ,u) ∈ [t0,∞) × R,
and f (t,u) is nondecreasing in u ∈ R for each fixed t t0. It is shown that (1) is oscillatory
if and only if the certain non-neutral differential equation is oscillatory, for the case where
0 μ h(t) λ<1 or 1<λ h(t) μ.
2002 Elsevier Science (USA). All rights reserved.
