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On oscillatory solutions of certain forced Emden–Fowler like equations
We give a constructive proof of existence to oscillatory solutions for the differential equations x ″ ( t ) + a ( t ) | x ( t ) | λ sign [ x ( t ) ] = e ( t ) , where t ⩾ t 0 ⩾ 1 and λ > 1 , that decay to 0 when t → + ∞ as O ( t − μ ) for μ > 0 as close as desired to the “critical quantity” μ...
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| Published in: | Journal of mathematical analysis and applications 2008-12, Vol.348 (1), p.211-219 |
|---|---|
| Main Author: | |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Citations: | Items that this one cites Items that cite this one |
| Online Access: | Get full text |
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| Summary: | We give a constructive proof of existence to oscillatory solutions for the differential equations
x
″
(
t
)
+
a
(
t
)
|
x
(
t
)
|
λ
sign
[
x
(
t
)
]
=
e
(
t
)
, where
t
⩾
t
0
⩾
1
and
λ
>
1
, that decay to 0 when
t
→
+
∞
as
O
(
t
−
μ
)
for
μ
>
0
as close as desired to the “critical quantity”
μ
⋆
=
2
λ
−
1
. For this class of equations, we have
lim
t
→
+
∞
E
(
t
)
=
0
, where
E
(
t
)
<
0
and
E
″
(
t
)
=
e
(
t
)
throughout
[
t
0
,
+
∞
)
. We also establish that for any
μ
>
μ
⋆
and any negative-valued
E
(
t
)
=
o
(
t
−
μ
)
as
t
→
+
∞
the differential equation has a negative-valued solution decaying to 0 at +
∞ as
o
(
t
−
μ
)
. In this way, we are not in the reach of any of the developments from the recent paper [C.H. Ou, J.S.W. Wong, Forced oscillation of
nth-order functional differential equations, J. Math. Anal. Appl. 262 (2001) 722–732]. |
|---|---|
| ISSN: | 0022-247X 1096-0813 |
| DOI: | 10.1016/j.jmaa.2008.07.025 |