Abstract
AbstractIn this paper, we establish some sufficient conditions which ensure that the solutions of the third order delay difference equation with a negative middle term $$ \Delta \bigl(a_{n}\Delta (\Delta w_{n})^{\alpha } \bigr)-p_{n}(\Delta w_{n+1})^{ \alpha }-q_{n}h(w_{n-l})=0,\quad n\geq n_{0}, $$
Δ
(
a
n
Δ
(
Δ
w
n
)
α
)
−
p
n
(
Δ
w
n
+
1
)
α
−
q
n
h
(
w
n
−
l
)
=
0
,
n
≥
n
0
,
are oscillatory. Moreover, we study the asymptotic behavior of the nonoscillatory solutions. Two illustrative examples are included for illustration.
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Algebra and Number Theory,Analysis
Reference19 articles.
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5. Aktas, M.F., Tiryaki, A., Zafer, A.: Oscillation of third order nonlinear delay difference equations. Turk. J. Math. 36, 422–436 (2012)
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