关于N维环域上各向异性N-拉普拉斯算子的自由边值问题

Pub Date : 2020-07-01 DOI:10.2478/auom-2020-0027

A. Nicolescu, S. Vlase

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引用次数: 0

摘要

摘要本文研究环域上各向性N-拉普拉斯算子的自由边值问题Ω:=Ω0\Ω¯1∧𝕉N \Omega:= {\Omega ＿0 }\backslash{\bar\Omega ＿1 } \subset{\mathbb{R} ^N } ， n≥2。我们的目的是表明，如果问题在合适的弱意义上有解，则底层域Ω是一个Wulff形环。该证明利用了L.E. Payne意义上的一个合适的p函数的极大值原理和一些涉及自由边界各向异性平均曲率的几何参数。

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

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:=Ω0\Ω¯1⊂𝕉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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