On the critical points of solutions of Robin boundary problems
Abstract
In this paper we prove the uniqueness of the critical point for stable solutions of the Robin problem \[ cases - u=f(u)&in \\ u>0&in \\ ∂ u+β u=0&on ∂, cases \] where ⊂eqR2 is a smooth and bounded domain with strictly positive curvature of the boundary, f0 is a smooth function and β>0. Moreover, for β large the result fails as soon as the domain is no more convex, even if it is very close to be: indeed, in this case it is possible to find solutions with an arbitrary large number of critical points.
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