Stable critical point of the Robin function and bubbling phenomenon for a slightly subcritical elliptic problem
Abstract
In this paper, we deal with the boundary value problem - u= |u|4/(n-2)u/[ (e+|u|)] in a bounded smooth domain in Rn, n≥ 3 with homogenous Dirichlet boundary condition. Here >0. Clapp et al. in Journal of Diff. Eq. (Vol 275) built a family of solution blowing up if n≥ 4 and small enough. They conjectured in their paper the existence of sign changing solutions which blow up and blow down at the same point. Here we give a confirmative answer by proving that our slightly subcritical problem has a solution with the shape of sign changing bubbles concentrating on a stable critical point of the Robin function for sufficiently small.
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