Asymptotic order of the quantization errors for self-affine measures on Bedford-McMullen carpets

Abstract

Let E be a Bedford-McMullen carpet determined by a set of affine mappings (fij)(i,j)∈ G and μ a self-affine measure on E associated with a probability vector (pij)(i,j)∈ G. We prove that, for every r∈(0,∞), the upper and lower quantization coefficient are always positive and finite in its exact quantization dimension sr. As a consequence, the kth quantization error for μ of order r is of the same order as k-1sr. In sharp contrast to the Hausdorff measure for Bedford-McMullen carpets, our result is independent of the horizontal fibres of the carpets.