Abstract
AbstractIn this paper, we investigate the existence of ground state solutions and non-existence of non-trivial weak solution of the equation $$\begin{aligned} \Delta ^{2} u= \Big (|x|^{-\theta }*|u|^{p_{\theta }}\Big )|u|^{p_{\theta }-2}u +\alpha \Big (|x|^{-\gamma }*|u|^{p}\Big )|u|^{p-2}u \quad \text{ in } {{\mathbb {R}}}^{N}, \end{aligned}$$
Δ
2
u
=
(
|
x
|
-
θ
∗
|
u
|
p
θ
)
|
u
|
p
θ
-
2
u
+
α
(
|
x
|
-
γ
∗
|
u
|
p
)
|
u
|
p
-
2
u
in
R
N
,
where $$0<p\le p_{\gamma }^{*}$$
0
<
p
≤
p
γ
∗
, $$\alpha >0$$
α
>
0
, $$\theta , \gamma \in (0,N)$$
θ
,
γ
∈
(
0
,
N
)
, $$p_{\theta }=\frac{2(N-\theta )}{N-4}$$
p
θ
=
2
(
N
-
θ
)
N
-
4
and $$N\ge 5$$
N
≥
5
. Firstly, we prove the non-existence by establishing Pohozaev type of identity. Next, we study the existence of ground state solutions by using the minimization method on the associated Nehari manifold.
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Analysis
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