On a free boundary value problem for the anisotropic N-Laplace operator on an N−dimensional ring domain

Nicolescu, A. E.; Vlase, S.

doi:10.2478/auom-2020-0027

Abstract

In this paper we are going to investigate a free boundary value problem for the anisotropic N-Laplace operator on a ring domain $Ω : = Ω_{0} \ {\bar{Ω}}_{1} \subset 𝕉^{N}$ \Omega : = {\Omega _0}\backslash {\bar \Omega _1} \subset {\mathbb{R}^N}, N ≥ 2. Our aim is to show that if the problem admits a solution in a suitable weak sense, then the underlying domain Ω is a Wulff shaped ring. The proof makes use of a maximum principle for an appropriate P-function, in the sense of L.E. Payne and some geometric arguments involving the anisotropic mean curvature of the free boundary.

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On a free boundary value problem for the anisotropic N-Laplace operator on an N−dimensional ring domain

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