Least upper bound of the exact formula for optimal quantization of some uniform Cantor distributions

Abstract

The quantization scheme in probability theory deals with finding a best approximation of a given probability distribution by a probability distribution that is supported on finitely many points. Let P be a Borel probability measure on R such that P= 12 P S1-1+ 12 P S2-1, where S1 and S2 are two contractive similarity mappings given by S1(x)=rx and S2(x)=rx+1-r for 0<r< 12 and x∈ R. Then, P is supported on the Cantor set generated by S1 and S2. The case r= 13 was treated by Graf and Luschgy who gave an exact formula for the unique optimal quantization of the Cantor distribution P (Math. Nachr., 183 (1997), 113-133). In this paper, we compute the precise range of r-values to which Graf-Luschgy formula extends.