Asymptotics of the quantization errors for some Markov-type measures with complete overlaps
Abstract
Let be a directed graph with vertices . Let be a family of contractive similitudes. For every , let . For , we define . We assume that for every . Let denote the Mauldin-Williams fractal determined by . Let be a positive probability vector and a row-stochastic matrix which serves as an incidence matrix for . We denote by the Markov-type measure associated with and . Let and . Let be the natural projection from to and . We consider the following two cases: 1. has two strongly connected components consisting of vertices; 2. is strongly connected. With some assumptions for and , for case 1, we determine the exact value of the quantization dimension for and prove that the -dimensional lower quantization coefficient is always positive, but the upper one can be infinite; we establish a necessary and sufficient condition for the upper quantization coefficient for to be finite; for case 2, we determine in terms of a pressure-like function and prove that -dimensional upper and lower quantization coefficient are both positive and finite.
Cite
@article{arxiv.2202.07109,
title = {Asymptotics of the quantization errors for some Markov-type measures with complete overlaps},
author = {Sanguo Zhu},
journal= {arXiv preprint arXiv:2202.07109},
year = {2023}
}
Comments
Some typos are corrected