Prohorov度量中概率测度的量化

Universität Trier, Mathematik/Informatik, Forschungsbericht Pub Date : 2009-05-27 DOI:10.1137/S0040585X97983687

S. Graf, H. Luschgy

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引用次数: 10

摘要

对于${\bf R}^d$和$n\in{\bf N}$上的概率分布P，考虑$e_n = \inf \pi (P,Q)$，其中$\pi$表示Prokhorov度量，最小值被取为$|\mbox{supp}(Q) | \le n$的所有离散概率Q。我们研究了这个最小化问题的解Q、稳定性和经验估计量的一致性。对于某些类型的分布，我们确定第n个量化误差$e_n$收敛到零的确切速率为$n \rightarrow\infty$。

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Quantization for Probability Measures in the Prohorov Metric

For a probability distribution P on ${\bf R}^d$ and $n\in{\bf N}$ consider $e_n = \inf \pi (P,Q)$, where $\pi$ denotes the Prokhorov metric and the infimum is taken over all discrete probabilities Q with $|\mbox{supp}(Q) | \le n$. We study solutions Q of this minimization problem, stability properties, and consistency of empirical estimators. For some classes of distributions we determine the exact rate of convergence to zero of the nth quantization error $e_n$ as $n \rightarrow\infty$.

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来源期刊

Universität Trier, Mathematik/Informatik, Forschungsbericht

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