Invariance of multifractal spectrum of uniform self-affine measures and its applications

Abstract

We study the bi-Lipschitz classification of Bedford-McMullen carpets which are totally disconnected. Let E be a such carpet and let μE be the uniform Bernoulli measure on E. We show that the multifractal spectrum and the doubling property of μE are both invariant under a bi-Lipschitz map. Moreover, we show that if μE and μF are doubling, then a bi-Lipschitz map between E and F enjoys a certain measure preserving property.