Robin eigenvalues on domains with peaks
Abstract
Let ⊂RN, N 2, be a bounded domain with an outward power-like peak which is assumed not too sharp in a suitable sense. We consider the Laplacian u - u in with the Robin boundary condition ∂n u=α u on ∂ with ∂n being the outward normal derivative and α>0 being a parameter. We show that for large α the associated eigenvalues Ej(α) behave as Ej(α) -εj α, where >2 and εj>0 depend on the dimension and the peak geometry. This is in contrast with the well-known estimate Ej(α)=O(α2) for the Lipschitz domains.
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