Quantization dimensions for inhomogeneous bi-Lipschitz Iterated Function Systems
Probability
2025-02-25 v2
Abstract
Let be a Borel probability measure on a -dimensional Euclidean space , , with a compact support, and let be a probability vector with for . Let be a set of contractive mappings on . Then, a Borel probability measure on such that is called an inhomogeneous measure, also known as a condensation measure on . For a given , the quantization dimension of order , if it exists, denoted by , of a Borel probability measure on represents the speed at which the th quantization error of order approaches to zero as the number of elements in an optimal set of -means for tends to infinity. In this paper, we investigate the quantization dimension for such a condensation measure.
Cite
@article{arxiv.2303.14731,
title = {Quantization dimensions for inhomogeneous bi-Lipschitz Iterated Function Systems},
author = {Amit Priyadarshi and Mrinal K. Roychowdhury and Manuj Verma},
journal= {arXiv preprint arXiv:2303.14731},
year = {2025}
}