Azer Sign-changing radial solutions for a semilinear problem on exterior domains with nonlinear boundary conditions: existence of sign radial solution

Boubker Azeroual; Abderrahim Zertiti

doi:10.5269/bspm.66896

Autores

Azeroual boubker National school of applied sciences https://orcid.org/0000-0003-4600-6419
Abderrahim Zertiti National School of Applied Sciences

DOI:

https://doi.org/10.5269/bspm.66896

Resumo

In this paper we are interested to the existence and multiplicity of sign changing radial solutions of problem of elliptic equations $\Delta U(x)+\varphi(|x|)f(U)=0$ with a nonlinear boundary conditions on exterior of the unite ball centered at the origin in $\mathbb{R}^{N}$ such that $ u(x) \rightarrow 0$ as $ |x|\to \infty $, with any given number of zeros where the nonlinearity $ f(u) $ is odd, superlinear for $ u $ lager enough and $ f<0 $ on $(0,\beta)$, $ f>0$ on $(\beta,\infty) $. The function $\varphi>0$ is $ C^{1} $ on $ [R,\infty) $ where $ 0<\varphi(|x|)\leq c_0\,|x|^{-\alpha}$ with $ \alpha>2(N-1) $ and $ N>2 $ for large $ |x| $.

Biografia do Autor

Azeroual boubker, National school of applied sciences

Departement of Mathematics and Decision Making
Abderrahim Zertiti, National School of Applied Sciences

Department of Mathematics

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