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Positive entire stable solutions of inhomogeneous semilinear elliptic equations
For n ≥ 3 and p > 1 , the elliptic equation Δ u + K ( x ) u p + μ f ( x ) = 0 in R n possesses a continuum of positive entire solutions, provided that (i) locally Hölder continuous functions K and f vanish rapidly, for instance, K ( x ) , f ( x ) = O ( | x | l ) near ∞ for some l < − 2 and (ii...
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| Published in: | Nonlinear analysis 2011-12, Vol.74 (18), p.7012-7024 |
|---|---|
| Main Authors: | , |
| 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: | For
n
≥
3
and
p
>
1
, the elliptic equation
Δ
u
+
K
(
x
)
u
p
+
μ
f
(
x
)
=
0
in
R
n
possesses a continuum of positive entire solutions, provided that (i) locally Hölder continuous functions
K
and
f
vanish rapidly, for instance,
K
(
x
)
,
f
(
x
)
=
O
(
|
x
|
l
)
near
∞
for some
l
<
−
2
and (ii)
μ
≥
0
is sufficiently small. Especially, in the radial case with
K
(
x
)
=
k
(
|
x
|
)
and
f
(
x
)
=
g
(
|
x
|
)
for some appropriate functions
k
,
g
on
[
0
,
∞
)
, there exist two intervals
I
μ
,
1
,
I
μ
,
2
such that for each
α
∈
I
μ
,
1
the equation has a positive entire solution
u
α
with
u
α
(
0
)
=
α
which converges to
l
∈
I
μ
,
2
at
∞
, and
u
α
1
<
u
α
2
for any
α
1
<
α
2
in
I
μ
,
1
. Moreover, the map
α
to
l
is one-to-one and onto from
I
μ
,
1
to
I
μ
,
2
. If
K
≥
0
, each solution regarded as a steady state for the corresponding parabolic equation is stable in the uniform norm; moreover, in the radial case the solutions are also weakly asymptotically stable in the weighted uniform norm with weight function
|
x
|
n
−
2
. |
|---|---|
| ISSN: | 0362-546X 1873-5215 |
| DOI: | 10.1016/j.na.2011.07.022 |