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On the asymptotic quantization error for the doubling measures on Moran sets

Functional Analysis 2019-08-02 v1

Abstract

We study the quantization errors for the doubling probability measures μ\mu which are supported on a class of Moran sets ERqE\subset\mathbb{R}^q. For each n1n\geq 1, let αn\alpha_n be an arbitrary nn-optimal set for μ\mu of order rr and {Pa(αn)}aαn\{P_a(\alpha_n)\}_{a\in\alpha_n} an arbitrary Voronoi partition with respect to αn\alpha_n. We denote by Ia(αn,μ)I_a(\alpha_n,\mu) the integral Pa(αn)d(x,a)rdμ(x)\int_{P_a(\alpha_n)}d(x,a)^rd\mu(x) and define \begin{eqnarray*} \underline{J}(\alpha_n,\mu):=\min\limits_{a\in\alpha_n}I_a(\alpha_n,\mu),\; \overline{J}(\alpha_n,\mu):=\max\limits_{a\in\alpha_n}I_a(\alpha_n,\mu). \end{eqnarray*} Let en,r(μ)e_{n,r}(\mu) denote the nnth quantization error for μ\mu of order rr. Assuming a version of the open set condition for EE, we prove that J(αn,μ),J(αn,μ)1nen,rr(μ). \underline{J}(\alpha_n,\mu),\overline{J}(\alpha_n,\mu)\asymp\frac{1}{n}e_{n,r}^r(\mu). This result shows that, for the doubling measures on Moran sets EE, a weak version of Gersho's conjecture holds.

Keywords

Cite

@article{arxiv.1908.00202,
  title  = {On the asymptotic quantization error for the doubling measures on Moran sets},
  author = {Sanguo Zhu},
  journal= {arXiv preprint arXiv:1908.00202},
  year   = {2019}
}
R2 v1 2026-06-23T10:36:54.627Z