Optimal quantizers for a nonuniform distribution on a Sierpinski carpet

Abstract

The purpose of quantization for a probability distribution is to estimate the probability by a discrete probability with finite support. In this paper, a nonuniform probability measure P on R2 which has support the Sierpi\'nski carpet generated by a set of four contractive similarity mappings with equal similarity ratios has been considered. For this probability measure, the optimal sets of n-means and the nth quantization errors are investigated for all n≥ 2.