An Analog of the Neumann Problem for the 1-Laplace Equation in the Metric Setting: Existence, Boundary Regularity, and Stability

Pub Date : 2017-08-08 DOI:10.1515/agms-2018-0001
P. Lahti, Lukáš Malý, N. Shanmugalingam
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引用次数: 5

Abstract

Abstract We study an inhomogeneous Neumann boundary value problem for functions of least gradient on bounded domains in metric spaces that are equipped with a doubling measure and support a Poincaré inequality. We show that solutions exist under certain regularity assumptions on the domain, but are generally nonunique. We also show that solutions can be taken to be differences of two characteristic functions, and that they are regular up to the boundary when the boundary is of positive mean curvature. By regular up to the boundary we mean that if the boundary data is 1 in a neighborhood of a point on the boundary of the domain, then the solution is −1 in the intersection of the domain with a possibly smaller neighborhood of that point. Finally, we consider the stability of solutions with respect to boundary data.
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度量条件下1-Laplace方程Neumann问题的一个类比:存在性、边界正则性和稳定性
摘要我们研究了度量空间中有界域上最小梯度函数的非齐次Neumann边值问题,该问题具有二重测度并支持Poincaré不等式。我们证明了解在域上的某些正则性假设下存在,但通常是非唯一的。我们还证明了解可以看作两个特征函数的差,并且当边界为正平均曲率时,它们直到边界都是正则的。通过正则到边界,我们的意思是,如果边界数据在域边界上的一个点的邻域中为1,那么在域与该点的一个可能较小的邻域的交集中,解为−1。最后,我们考虑了解相对于边界数据的稳定性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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