Quantization and centroidal Voronoi tessellations for probability measures on dyadic Cantor sets
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Publication:2398030
DOI10.4171/JFG/47zbMath1388.60016arXiv1509.06037MaRDI QIDQ2398030
Publication date: 14 August 2017
Published in: Journal of Fractal Geometry (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1509.06037
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Canonical sequences of optimal quantization for condensation measures ⋮ Least upper bound of the exact formula for optimal quantization of some uniform Cantor distributions ⋮ Quantization for a probability distribution generated by an infinite iterated function system ⋮ Optimal quantization for the Cantor distribution generated by infinite similutudes ⋮ Optimal quantizers for a nonuniform distribution on a Sierpiński carpet ⋮ Quantization coefficients for uniform distributions on the boundaries of regular polygons ⋮ Quantization for uniform distributions of Cantor dusts on $\mathbb{R}^2$ ⋮ Quantization for uniform distributions on stretched Sierpiński triangles ⋮ Optimal quantization for mixed distributions ⋮ Optimal quantization via dynamics ⋮ High precision numerical computation of principal points for univariate distributions
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