Infinitely many sign-changing solutions for Choquard equation with doubly critical exponents

被引：1

作者：

Liu, Senli ^{[1
]}

Yang, Jie ^{[1
]}

Chen, Haibo ^{[1
]}

机构：

[1] Cent South Univ, Sch Math & Stat, Changsha, Hunan, Peoples R China

来源：

COMPLEX VARIABLES AND ELLIPTIC EQUATIONS | 2022年 / 67卷 / 02期

基金：

中国国家自然科学基金;

关键词：

Choquard equation; sign-changing solutions; perturbation approach; invariant sets of descending flow; critical exponents; SCHRODINGER-POISSON SYSTEM; ENERGY NODAL SOLUTIONS; GROUND-STATES; EXISTENCE; UNIQUENESS; DECAY;

D O I：

10.1080/17476933.2020.1825394

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

In this paper, we consider the following Choquard equation: - Delta u + u = (I-alpha * F(u))F' (u) in R-N where N >= 3, alpha is an element of (0, N), I-alpha is the Riesz potential, and F(u) := 1/p vertical bar u vertical bar(p) + 1/q vertical bar u vertical bar(q), where p = N+alpha/N and q = N+alpha/N-2 are lower and upper critical exponents in sense of the Hardy- Littlewood-Sobolev inequality. Based on perturbation method and the invariant sets of descending flow, we prove that the above equation possesses infinitely many sign-changing solutions. Our results extend the results in Seok [Nonlinear Choquard equations: doubly critical case. Appl Math Lett. 2018;76:148- 156] and Su [New result for nonlinear Choquard equations: doubly critical case. Appl Math Lett. 2020;102(106092):0-7].

引用

页码：315 / 337

页数：23

共 50 条

[31] INFINITELY MANY SOLUTIONS FOR THE FRACTIONAL p&q PROBLEM WITH CRITICAL SOBOLEV-HARDY EXPONENTS AND SIGN-CHANGING WEIGHT FUNCTIONS
Xu, Zhiguo
DIFFERENTIAL AND INTEGRAL EQUATIONS, 2021, 34 (9-10) : 519 - 537
[32] INFINITELY MANY SOLUTIONS FOR A CLASS OF CRITICAL CHOQUARD EQUATION WITH ZERO MASS
Gao, Fashun
Yang, Minbo
Santos, Carlos Alberto
Zhou, Jiazheng
TOPOLOGICAL METHODS IN NONLINEAR ANALYSIS, 2019, 54 (01) : 219 - 232
[33] Infinitely many sign-changing solutions for nonlinear fractional Kirchhoff equations
Gu, Guangze
Yang, Xianyong
Yang, Zhipeng
APPLICABLE ANALYSIS, 2022, 101 (16) : 5850 - 5871
[34] INFINITELY MANY SIGN-CHANGING SOLUTIONS FOR THE BREZIS-NIRENBERG PROBLEM
Sun, Jijiang
Ma, Shiwang
COMMUNICATIONS ON PURE AND APPLIED ANALYSIS, 2014, 13 (06) : 2317 - 2330
[35] The Nehari manifold for a fractional critical Choquard equation involving sign-changing weight functions
Lan, Fengqin
He, Xiaoming
NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS, 2019, 180 : 236 - 263
[36] Ground state sign-changing solutions for critical Choquard equations with steep well potential
Li, Yong -Yong
Li, Gui-Dong
Tang, Chun -Lei
ELECTRONIC JOURNAL OF QUALITATIVE THEORY OF DIFFERENTIAL EQUATIONS, 2022, (54) : 1 - 20
[37] Infinitely many sign-changing solutions for an elliptic equation involving double critical Hardy-Sobolev-Maz'ya terms*
Wang, Lixia
Zhao, Pingping
Zhang, Dong
NONLINEAR ANALYSIS-MODELLING AND CONTROL, 2022, 27 (05): : 863 - 878
[38] Infinitely many sign-changing solutions for planar Schrödinger-Poisson system
Zhou, Jianwen
Yang, Lu
Yu, Yuanyang
APPLICABLE ANALYSIS, 2025, 104 (04) : 612 - 628
[39] Infinitely many sign-changing solutions for planar Schrödinger-Newton equations
Wenbo Wang
Quanqing Li
Yuanyang Yu
Yongkun Li
Indian Journal of Pure and Applied Mathematics, 2021, 52 : 149 - 161
[40] Infinitely many radial and non-radial sign-changing solutions for Schrodinger equations
Li, Gui-Dong
Li, Yong-Yong
Tang, Chun-Lei
ADVANCES IN NONLINEAR ANALYSIS, 2022, 11 (01) : 907 - 920

← 1 2 3 4 5 →