Optimal quantization for the Cantor distribution generated by infinite similutudes

Abstract

Let P be a Borel probability measure on R generated by an infinite system of similarity mappings \Sj : j∈ N\ such that P=Σj=1∞ 12j P Sj-1, where for each j∈ N and x∈ R, Sj(x)= 13jx+1- 1 3j-1. Then, the support of P is the dyadic Cantor set C generated by the similarity mappings f1, f2 : R R such that f1(x)= 13 x and f2(x)= 13 x+ 23 for all x∈ R. In this paper, using the infinite system of similarity mappings \Sj : j∈ N\ associated with the probability vector ( 12, 122, ·s), for all n∈ N, we determine the optimal sets of n-means and the nth quantization errors for the infinite self-similar measure P. The technique obtained in this paper can be utilized to determine the optimal sets of n-means and the nth quantization errors for more general infinite self-similar measures.