熵运输成本的一个改进的中心极限定理和快速收敛速率

IF 1.9 Q1 MATHEMATICS, APPLIED SIAM journal on mathematics of data science Pub Date : 2022-04-19 DOI:10.48550/arXiv.2204.09105
E. Barrio, Alberto González-Sanz, Jean-Michel Loubes, Jonathan Niles-Weed
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引用次数: 22

摘要

我们证明了以总体成本为中心的亚高斯概率测度间熵运输成本的中心极限定理。这是第一个允许对不一定是离散的测度之间的熵最优输运进行渐近有效推断的结果。在紧密支持的情况下,我们用新的、更快的、经验测量之间预期熵运输成本的收敛率来补充这些结果。我们的证明是基于熵最优运输问题对偶解的强化收敛结果。
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An improved central limit theorem and fast convergence rates for entropic transportation costs
We prove a central limit theorem for the entropic transportation cost between subgaussian probability measures, centered at the population cost. This is the first result which allows for asymptotically valid inference for entropic optimal transport between measures which are not necessarily discrete. In the compactly supported case, we complement these results with new, faster, convergence rates for the expected entropic transportation cost between empirical measures. Our proof is based on strengthening convergence results for dual solutions to the entropic optimal transport problem.
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