Quantization for uniform distributions of Cantor dusts on R2
Abstract
Let P be a Borel probability measure on R2 supported by the Cantor dusts generated by a set of 4u,\ u≥ 1, contractive similarity mappings satisfying the strong separation condition. For this probability measure, we determine the optimal sets of n-means and the nth quantization errors for all n≥ 2. In addition, it is shown that though the quantization dimension of the measure P is known, the quantization coefficient for P does not exist.
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