A Liouville theorem for the higher-order fractional Laplacian

被引:6
|
作者
Zhuo, Ran [1 ]
Li, Yan [2 ]
机构
[1] Huanghuai Univ, Dept Math & Stat, Zhumadian 463000, Henan, Peoples R China
[2] Baylor Univ, Dept Math, Waco, TX 76798 USA
来源
COMMUNICATIONS IN CONTEMPORARY MATHEMATICS | 2019年 / 21卷 / 02期
基金
中国国家自然科学基金;
关键词
Higher-order fractional Laplacian; Green's function; the method of moving planes; symmetry; nonexistence; POSITIVE SOLUTIONS; SYSTEM; CLASSIFICATION; SYMMETRY;
D O I
10.1142/S0219199718500050
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
We study Navier problems involving the higher-order fractional Laplacians. We first obtain nonexistence of positive solutions, known as the Liouville-type theorems, in the upper half-space R-+(n) by studying an equivalent integral form of the fractional equation. Then we show symmetry for positive solutions on B-1(0) through a delicate iteration between lower-order differential/pseudo-differential equations split from the higher-order equation.
引用
收藏
页数:19
相关论文
共 50 条
  • [21] Multiorder Laplacian for synchronization in higher-order networks
    Lucas, Maxime
    Cencetti, Giulia
    Battiston, Federico
    PHYSICAL REVIEW RESEARCH, 2020, 2 (03):
  • [22] A priori bounds and a Liouville theorem on a half-space for higher-order elliptic Dirichlet problems
    Wolfgang Reichel
    Tobias Weth
    Mathematische Zeitschrift, 2009, 261 : 805 - 827
  • [23] A priori bounds and a Liouville theorem on a half-space for higher-order elliptic Dirichlet problems
    Reichel, Wolfgang
    Weth, Tobias
    MATHEMATISCHE ZEITSCHRIFT, 2009, 261 (04) : 805 - 827
  • [24] Higher-order representation of Karamata theorem
    Yang, Xi
    Xiong, Qian
    Peng, Zuoxiang
    COMMUNICATIONS IN STATISTICS-THEORY AND METHODS, 2024, 53 (08) : 2744 - 2756
  • [25] The Luzin Theorem for Higher-Order Derivatives
    Francos, Greg
    MICHIGAN MATHEMATICAL JOURNAL, 2012, 61 (03) : 507 - 516
  • [26] HIGHER-ORDER VERSIONS OF NOETHERS THEOREM
    BARBER, JS
    HORNDESKI, GW
    UTILITAS MATHEMATICA, 1989, 35 : 19 - 39
  • [27] The obstacle problem for a higher order fractional Laplacian
    Danielli, Donatella
    Ali, Alaa Haj
    Petrosyan, Arshak
    CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS, 2023, 62 (08)
  • [28] The obstacle problem for a higher order fractional Laplacian
    Donatella Danielli
    Alaa Haj Ali
    Arshak Petrosyan
    Calculus of Variations and Partial Differential Equations, 2023, 62
  • [29] On the fractional counterpart of the higher-order equations
    D'Ovidio, Mirko
    STATISTICS & PROBABILITY LETTERS, 2011, 81 (12) : 1929 - 1939
  • [30] HIGHER-ORDER FRACTIONAL LAPLACIANS: AN OVERVIEW
    Abatangelo, Nicola
    BRUNO PINI MATHEMATICAL ANALYSIS SEMINAR, 2021, 12 (01) : 53 - 80
12345