Author:
Qin Qin,Jie Guo,Suo Hongmin
Abstract
AbstractIn this paper, we investigate the existence of a least-energy sign-changing solutions for the following Kirchhoff-type equation: $$ - \biggl(1+b \int _{\mathbb{R}^{2}} K(x) \vert \nabla u \vert ^{2}\,dx \biggr) \operatorname{div} \bigl(K(x)\nabla u \bigr)=K(x)f(u),\quad x\in \mathbb{R}^{2}, $$
−
(
1
+
b
∫
R
2
K
(
x
)
|
∇
u
|
2
d
x
)
div
(
K
(
x
)
∇
u
)
=
K
(
x
)
f
(
u
)
,
x
∈
R
2
,
where f has exponential subcritical or exponential critical growth in the sense of the Trudinger–Moser inequality. By using the constrained variational methods, combining the deformation lemma and Miranda’s theorem, we prove the existence of a least-energy sign-changing solution. Moreover, we also prove that this sign-changing solution has exactly two nodal domains.
Funder
Natural Science Foundation of China
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Discrete Mathematics and Combinatorics,Analysis
Reference34 articles.
1. Kirchhoff, G.: Mechanik. Teubner, Leipzig (1883)
2. Chipot, M., Lovat, B.: Some remarks on nonlocal elliptic and parabolic problems. Nonlinear Anal. 30, 4619–4627 (1997)
3. Lions, J.L.: On some questions in boundary value problems of mathematical physics. North-Holl. Math. Stud. 30, 284–346 (1978)
4. Xiang, M.Q., Rǎdulescu, V.D., Zhang, B.: Fractional Kirchhoff problems with critical Trudinger–Moser nonlinearity. Calc. Var. 58, 57 (2019)
5. Shuai, W.: Sign-changing solutions for a class of Kirchhoff-type problem in bounded domains. J. Differ. Equ., 1–19 (2015)