推土器距离期望值的概化

William Q. Erickson
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引用次数: 9

摘要

在集合$[n]=\{1,\dots,n\}$上,推土机的距离(EMD),也称为第一Wasserstein距离,可以自然地扩展到比较任意多个概率分布,而不仅仅是两个。我们介绍了这种泛化的细节,以及受组合学启发的高效算法;在三个分布的特殊情况下,EMD是成对EMD之和的一半。我们扩展了Bourn和Willenbring (arXiv:1903.03673)的方法,使用与Segre嵌入的Hilbert级数一致的生成函数,计算了该广义EMD在随机分布$d$元组上的期望值。然后,我们使用EMD来分析真实世界的等级分布数据集。
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A generalization for the expected value of the earth mover’s distance
The earth mover's distance (EMD), also called the first Wasserstein distance, can be naturally extended to compare arbitrarily many probability distributions, rather than only two, on the set $[n]=\{1,\dots,n\}$. We present the details for this generalization, along with a highly efficient algorithm inspired by combinatorics; it turns out that in the special case of three distributions, the EMD is half the sum of the pairwise EMD's. Extending the methods of Bourn and Willenbring (arXiv:1903.03673), we compute the expected value of this generalized EMD on random $d$-tuples of distributions, using a generating function which coincides with the Hilbert series of the Segre embedding. We then use the EMD to analyze a real-world data set of grade distributions.
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Journal of Algebraic Statistics
Journal of Algebraic Statistics STATISTICS & PROBABILITY-
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