BV Functions and Nonlocal Functionals in Metric Measure Spaces

Panu Lahti, Andrea Pinamonti, Xiaodan Zhou
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Abstract

We study the asymptotic behavior of three classes of nonlocal functionals in complete metric spaces equipped with a doubling measure and supporting a Poincaré inequality. We show that the limits of these nonlocal functionals are comparable to the total variation \(\Vert Df\Vert (\Omega )\) or the Sobolev semi-norm \(\int _\Omega g_f^p\, d\mu \), which extends Euclidean results to metric measure spaces. In contrast to the classical setting, we also give an example to show that the limits are not always equal to the corresponding total variation even for Lipschitz functions.

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公度量空间中的 BV 函数和非局部函数
我们研究了完全度量空间中的三类非局部函数的渐近行为,它们都配备了加倍度量并支持泊恩卡雷不等式。我们证明了这些非局部函数的极限与总变分(\Vert Df\Vert (\Omega )\)或索博勒夫半规范(\int _\Omega g_f^p\, d\mu \)相当,后者将欧几里得结果扩展到了度量空间。与经典情形不同的是,我们还举了一个例子来说明,即使对于 Lipschitz 函数,极限也并不总是等于相应的总变化。
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