Quantization for a condensation system

Abstract

For a given r ∈ (0, +∞), the quantization dimension of order r, if it exists, denoted by Dr(μ), represents the rate at which the nth quantization error of order r approaches to zero as the number of elements n in an optimal set of n-means for μ tends to infinity. If Dr(μ) does not exist, we define Dr(μ) and Dr(μ) as the lower and the upper quantization dimensions of μ of order r, respectively. In this paper, we investigate the quantization dimension of the condensation measure μ associated with a condensation system (\Sj\j=1N, (pj)j=0N, ). We provide two examples: one where is an infinite discrete distribution on R, and one where is a uniform distribution on R. For both the discrete and uniform distributions , we determine the optimal sets of n-means, and calculate the quantization dimensions of condensation measures μ, and show that the Dr(μ)-dimensional quantization coefficients do not exist. Moreover, we demonstrate that the lower and upper quantization coefficients are finite and positive.

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