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Liouville Type Theorem for Some Nonlocal Elliptic Equations

Analysis of PDEs 2017-06-13 v1

Abstract

In this paper, we prove some Liouville theorem for the following elliptic equations involving nonlocal nonlinearity and nonlocal boundary value condition {Δu(y)=\intprF(u(x,0))(x,0)yNαdxg(u(y)),yR,uν(x,0)=\intrG(u(y))(x,0)yNαdyf(u(x,0)),(x,0)R+N, \left\{ \begin{array}{ll} \displaystyle -\Delta u(y)=\intpr \frac{ F(u(x',0))}{|(x',0)-y|^{N-\alpha}}dx'g(u(y)), &y\in\R, \\ \\ \displaystyle \frac{\partial u}{\partial \nu}(x',0)=\intr \frac{G(u(y))}{|(x',0)-y|^{N-\alpha}}\,dy f(u(x',0)), &(x',0)\in\partial \mathbb R_+^N, \end{array} \right. where R+N={xRN:xN>0}\mathbb R_+^N=\{x\in \mathbb R^N:x_N>0\}, f,g,F,Gf,g,F,G are some nonlinear functions. Under some assumptions on the nonlinear functions f,g,F,Gf,g,F,G, we will show that this equation doesn't possess nontrivial positive solution. We extend the Liouville theorems from local problems to nonlocal problem. We use the moving plane method to prove our result.

Keywords

Cite

@article{arxiv.1706.03467,
  title  = {Liouville Type Theorem for Some Nonlocal Elliptic Equations},
  author = {Xiaohui Yu},
  journal= {arXiv preprint arXiv:1706.03467},
  year   = {2017}
}

Comments

16 pages

R2 v1 2026-06-22T20:15:36.650Z