REGULARITY AND NONEXISTENCE OF SOLUTIONS FOR A SYSTEM INVOLVING THE FRACTIONAL LAPLACIAN

被引:2
|
作者
Tang, De [1 ]
Fang, Yanqin [1 ]
机构
[1] Hunan Univ, Sch Math, Changsha 410082, Hunan, Peoples R China
来源
COMMUNICATIONS ON PURE AND APPLIED ANALYSIS | 2015年 / 14卷 / 06期
基金
中国国家自然科学基金;
关键词
Fractional laplacians; moving planes in integral forms; equivalence; integral equations; nonexistence; Kelvin transform; LIOUVILLE TYPE THEOREMS; ELLIPTIC-EQUATIONS;
D O I
10.3934/cpaa.2015.14.2431
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
We consider a system involving the fractional Laplacian { (-Delta)(alpha 1/2) u = u(p1) v(q1) in R-+(N), (-Delta)(alpha 2/2) v = u(p2) v(q2) in R-+(N), (1) u = v = 0, in R-N\R-+(N), where alpha(i) is an element of (0, 2), p(i), q(i) > 0, i = 1, 2. Based on the uniqueness of alpha-harmonic function ([9]) on half space, the equivalence between (1) and integral equations { u(x) = C(1)x(N) (alpha 1/2) + integral(R+N) G(infinity)(1)(x, y)u(p1) (y)v(q1) (y)dy, (2) v(x) = C(2)x(N) (alpha 2/2) + integral(R+N) G(infinity)(2)(x, y)u(p2) (y)v(q2) (y)dy. are derived Based on this result we deal with integral equations (2) instead of (1) and obtain the regularity. Especially, by the method of moving planes in integral forms which is established by Chen-Li-Ou [12] we obtain the nonexistence of positive solutions of integral equations (2) under only local integrability assumptions.
引用
收藏
页码:2431 / 2451
页数:21
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