×
验证码:
换一张
忘记密码?
记住我
CORC
首页
科研机构
检索
知识图谱
申请加入
托管服务
登录
注册
在结果中检索
科研机构
武汉物理与数学研究... [18]
数学与系统科学研究... [15]
中南大学 [14]
兰州大学 [9]
山东大学 [9]
大连理工大学 [7]
更多...
内容类型
期刊论文 [98]
其他 [4]
会议论文 [2]
发表日期
2020 [2]
2019 [4]
2018 [6]
2017 [3]
2016 [8]
2015 [10]
更多...
学科主题
mathematic... [8]
数学 [1]
非线性偏微分方程 [1]
×
知识图谱
CORC
开始提交
已提交作品
待认领作品
已认领作品
未提交全文
收藏管理
QQ客服
官方微博
反馈留言
浏览/检索结果:
共104条,第1-10条
帮助
已选(
0
)
清除
条数/页:
5
10
15
20
25
30
35
40
45
50
55
60
65
70
75
80
85
90
95
100
排序方式:
请选择
发表日期升序
发表日期降序
提交时间升序
提交时间降序
题名升序
题名降序
作者升序
作者降序
INFINITELY MANY SOLUTIONS FOR A CLASS OF SUBLINEAR FRACTIONAL SCHRODINGER-POISSON SYSTEMS
期刊论文
QUAESTIONES MATHEMATICAE, 2020, 卷号: 44, 期号: 9, 页码: 1197-1207
作者:
Guan, Wen
;
Ma, Lu-Ping
;
Wang, Da-Bin
;
Zhang, Jin-Long
收藏
  |  
浏览/下载:3/0
  |  
提交时间:2021/12/17
Schrodinger-Poisson systems
fractional
variational methods
Infinitely many solutions for a class of sublinear fractional Schrodinger equations with indefinite potentials
期刊论文
JOURNAL OF INEQUALITIES AND APPLICATIONS, 2020, 卷号: 2020, 期号: 1
作者:
Guan, Wen
;
Wang, Bin
;
Hao, Xinan
收藏
  |  
浏览/下载:8/0
  |  
提交时间:2022/03/01
Fractional Schrodinger equation
Indefinite potential
Symmetric mountain pass theorem
On existence solution for Schrodinger-Kirchhoff-type equations involving the fractional p-Laplacian in Double-struck capital R-N
期刊论文
COMPLEX VARIABLES AND ELLIPTIC EQUATIONS, 2019, 卷号: 64, 期号: 3, 页码: 461-481
作者:
Nguyen Van Thin
;
Pham Thi Thuy
收藏
  |  
浏览/下载:5/0
  |  
提交时间:2019/12/11
Integrodifferential operators
Schrodinger-Kirchhoff-type equation
Mountain Pass Theorem
The existence of solutions for an impulsive fractional coupled system of (p, q)-Laplacian type without the Ambrosetti-Rabinowitz condition
期刊论文
MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2019, 卷号: 42, 期号: 5, 页码: 1449-1464
作者:
Li, Dongping
;
Chen, Fangqi
;
An, Yukun
收藏
  |  
浏览/下载:12/0
  |  
提交时间:2019/12/11
Ambrosetti-Rabinowitz condition
fractional differential equations
mountain pass theorem
variational approach
(p
q)-Laplacian type
Existence of solutions to some fractional equations involving the Bessel operator in R-N
期刊论文
ANNALES POLONICI MATHEMATICI, 2019, 卷号: 122, 期号: 3, 页码: 267-300
作者:
Nguyen Van Thin
收藏
  |  
浏览/下载:4/0
  |  
提交时间:2019/12/11
fractional Laplace
Bessel operator
Mountain Pass Theorem
Existence and nondegeneracy of ground states in critical free boundary problems
期刊论文
NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS, 2019, 卷号: Vol.180, 页码: 75-93
作者:
Yang, Yang
;
Perera, Kanishka
收藏
  |  
浏览/下载:7/0
  |  
提交时间:2019/12/17
Critical free boundary problems
Ground state solutions
Existence
Nondegeneracy
Nondifferentiable energy functional
Regularization
Concentration compactness
Mountain pass theorem
Regularity of the free boundary
EXISTENCE OF SOLUTIONS FOR FRACTIONAL DIFFERENTIAL EQUATION WITH P-LAPLACIAN THROUGH VARIATIONAL METHOD
期刊论文
JOURNAL OF APPLIED ANALYSIS AND COMPUTATION, 2018, 卷号: 8, 期号: 6, 页码: 1778-1795
作者:
Li, Dongping
;
Chen, Fangqi
;
An, Yukun
收藏
  |  
浏览/下载:2/0
  |  
提交时间:2019/12/11
Fractional differential equation
p-Laplacian operator
variational
method
mountain pass theorem
iterative technique
Multiplicity of solutions for a class of fractional p-Kirchhoff system with sign-changing weight functions
期刊论文
BOUNDARY VALUE PROBLEMS, 2018
作者:
Wei, Yunfeng
;
Chen, Caisheng
;
Yang, Hongwei
;
Song, Hongxue
收藏
  |  
浏览/下载:3/0
  |  
提交时间:2019/12/11
Fractional p-Kirchhoff system
Multiplicity
Sign-changing weight
functions
Nehari manifold
Mountain pass theorem
On existence solution for Schrödinger–Kirchhoff-type equations involving the fractional p-Laplacian in
期刊论文
Complex Variables and Elliptic Equations, 2018, 页码: 1-21
作者:
Thin N.V.
;
Thuy P.T.
收藏
  |  
浏览/下载:12/0
  |  
提交时间:2019/12/11
Integrodifferential operators
Mountain Pass Theorem
Schrödinger–Kirchhoff-type equation
Multiplicity and concentration results for fractional Schrödinger‐Poisson systems involving a Bessel operator
期刊论文
Mathematical Methods in the Applied Sciences, 2018, 卷号: 41, 期号: 17, 页码: 7599-7611
作者:
Shen, Liejun*
收藏
  |  
浏览/下载:4/0
  |  
提交时间:2019/12/23
Bessel operator
concave-convex
concentration
Mountain-pass theorem
multiplicity
variational principle
©版权所有 ©2017 CSpace - Powered by
CSpace