Boundary concentration phenomena for an anisotropic Neumann problem in R2

Abstract

Given a smooth bounded domain in R2, we study the following anisotropic Neumann problem cases -∇(a(x)∇ u)+a(x)u=λ a(x) up-1eup,\,\,\,\, u>0\,\,\,\,\, in\,\,\,\,\, ,\\[2mm] ∂ u∂=0\,\, \ \ \ \ \,\, on\,\,\, ∂, cases where λ>0 is a small parameter, 0<p<2, a(x) is a positive smooth function over and denotes the outer unit normal vector to ∂. Under suitable assumptions on anisotropic coefficient a(x), we construct solutions of this problem with arbitrarily many mixed interior and boundary bubbles which concentrate at totally different strict local maximum or minimal boundary points of a(x) restricted to ∂, or accumulate to the same strict local maximum boundary point of a(x) over as λ→0.

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