具有对数凹密度的\（\mathbb｛R｝^1）上n气泡问题的解

Pub Date : 2023-09-28 DOI:10.1007/s10455-023-09927-8

John Ross

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引用次数: 0

摘要

我们研究了具有规定密度函数f的\（\mathbb｛R｝^1）上的n气泡问题，该密度函数f是均匀的、径向递增的，并且满足对数凹度要求。在这些条件下，我们发现对于任意数量的区域，等周解可以被识别，并且这些解具有被充分理解的规则结构。这推广了最近关于密度函数（|x|^p\）的工作，并与已知没有这种正则结构的对数凸密度函数形成了对比。

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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Solution to the n-bubble problem on \(\mathbb {R}^1\) with log-concave density

We study the n-bubble problem on \(\mathbb {R}^1\) with a prescribed density function f that is even, radially increasing, and satisfies a log-concavity requirement. Under these conditions, we find that isoperimetric solutions can be identified for an arbitrary number of regions, and that these solutions have a well-understood and regular structure. This generalizes recent work done on the density function \(|x |^p\) and stands in contrast to log-convex density functions which are known to have no such regular structure.

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