Quantization for probability measures in the Prokhorov metric

Title	Quantization for probability measures in the Prokhorov metric
Publication Type	Journal Article
Year of Publication	2009
Authors	Harald Luschgy, and Siegfried Graf
Journal	Theory Probab. Appl.
Volume	53
Pagination	216-241
Keywords	asymptotic quantization error, empirical measures, entropy, Ky Fan metric, multidimensional quantization, optimal quantizers, Prokhorov metric, quantization dimension
Abstract	For a probability distribution $P$ on $\mathbb{R}^d$ and $n\in N$ consider $e_n=inf \pi(P,Q)$ , where $\pi$ denotes the Prokhorov metric and the infimum is taken over all discrete probabilities $Q$ with $\|\textrm{supp}(Q)\|\leq n$ . 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 $n$ th quantization error en as $n\to \infty$ .

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