English

Multiple positive solutions to elliptic boundary blow-up problems

Analysis of PDEs 2017-03-23 v2

Abstract

We prove the existence of multiple positive radial solutions to the sign-indefinite elliptic boundary blow-up problem {Δu+(a+(x)μa(x))g(u)=0,  x<1,u(x),  x1, \left\{\begin{array}{ll} \Delta u + \bigl(a^+(\vert x \vert) - \mu a^-(\vert x \vert)\bigr) g(u) = 0, & \; \vert x \vert < 1, \\ u(x) \to \infty, & \; \vert x \vert \to 1, \end{array} \right. where gg is a function superlinear at zero and at infinity, a+a^+ and aa^- are the positive/negative part, respectively, of a sign-changing function aa and μ>0\mu > 0 is a large parameter. In particular, we show how the number of solutions is affected by the nodal behavior of the weight function aa. The proof is based on a careful shooting-type argument for the equivalent singular ODE problem. As a further application of this technique, the existence of multiple positive radial homoclinic solutions to Δu+(a+(x)μa(x))g(u)=0,xRN, \Delta u + \bigl(a^+(\vert x \vert) - \mu a^-(\vert x \vert)\bigr) g(u) = 0, \qquad x \in \mathbb{R}^N, is also considered.

Keywords

Cite

@article{arxiv.1607.05585,
  title  = {Multiple positive solutions to elliptic boundary blow-up problems},
  author = {Alberto Boscaggin and Walter Dambrosio and Duccio Papini},
  journal= {arXiv preprint arXiv:1607.05585},
  year   = {2017}
}
R2 v1 2026-06-22T14:58:31.939Z