融合的极致点

arXiv - ECON - Theoretical Economics Pub Date : 2024-09-16 DOI:arxiv-2409.10779

Andreas Kleiner, Benny Moldovanu, Philipp Strack, Mark Whitmeyer

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引用次数: 0

摘要

我们的研究探索了融合、均值保留收缩的多维对应物及其极值和暴露点。我们揭示了这些对象的优雅几何/组合结构。尤其值得注意的是利普切茨暴露点（利普切茨连续目标的唯一优化量）与幂图之间的联系，幂图是根据加权临近准则将空间划分为凸多面体 "单元"。这些对象在自然界中经常出现--如生物系统中的细胞结构、晶体和植物的生长模式以及动物栖息地的领土划分--正如我们所展示的，它们提供了李普齐兹暴露融合的基本结构。我们将我们的结果应用于几个有关分类的问题。

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The Extreme Points of Fusions

Our work explores fusions, the multidimensional counterparts of mean-preserving contractions and their extreme and exposed points. We reveal an elegant geometric/combinatorial structure for these objects. Of particular note is the connection between Lipschitz-exposed points (measures that are unique optimizers of Lipschitz-continuous objectives) and power diagrams, which are divisions of a space into convex polyhedral ``cells'' according to a weighted proximity criterion. These objects are frequently seen in nature--in cell structures in biological systems, crystal and plant growth patterns, and territorial division in animal habitats--and, as we show, provide the essential structure of Lipschitz-exposed fusions. We apply our results to several questions concerning categorization.

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arXiv - ECON - Theoretical Economics

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