Abstract
We consider the following nonlinear Neumann problem: where Ω ⊂ ℝN is a smooth and bounded domain, μ < 0 and n denotes the outward unit normal vector of ∂Ω. Lin and Ni (1986) conjectured that for μ small, all solutions are constants. We show that this conjecture is false for all dimensions in some (partially symmetric) nonconvex domains Ω. Furthermore, we prove that for any fixed μ there are infinitely many positive solutions, whose energy can be made arbitrarily large. This seems to be a new phenomenon for elliptic problems in bounded domains.
| Original language | English |
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| Pages (from-to) | 4581-4615 |
| Number of pages | 35 |
| Journal | Transactions of the American Mathematical Society |
| Volume | 362 |
| Issue number | 9 |
| DOIs | |
| State | Published - Sep 2010 |