Convergence order of the quantization error for self-affine measures on Lalley-Gatzouras carpets
Abstract: Let $E$ be a Lalley-Gatzouras carpet determined by a set of contractive affine mappings ${f_{ij}}_{(i,j)\in G}$. We study the asymptotics of quantization error for the self-affine measures $\mu$ on $E$. We prove that the upper and lower quantization coefficient for $\mu$ are both bounded away from zero and infinity in the exact quantization dimension. This significantly generalizes the previous work concerning the quantization for self-affine measures on Bedford-McMullen carpets. The new ingredients lie in the method to bound the quantization error for $\mu$ from below and that to construct auxiliary measures by applying Prohorov's theorem.
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