The quantization for Markov-type measures on a class of ratio-specified graph directed fractals

Abstract

We study the asymptotic quantization error of order r for Markov-type measures μ on a class of ratio-specified graph directed fractals. We show that the quantization dimension of μ exists and determine its exact value sr in terms of spectral radius of a related matrix. We prove that the sr-dimensional lower quantization coefficient of μ is always positive. Moreover, inspired by Mauldin-Williams's work on the Hausdorff measure of graph directed fractals, we establish a necessary and sufficient condition for the sr-dimensional upper quantization coefficient of μ to be finite.