Locally measure preserving property of bi-Lipschitz maps between Moran sets
Abstract
In literature it is shown that bi-Lipschitz maps between self-similar sets or self-affine sets enjoy a locally measure preserving property, namely, if f:(E,μ) (F,) is a bi-Lipschitz map, then the Radon-Nykodym derivative df*/dμ is a constant function on a subset E'⊂ E with μ(E')>0, where f*(·)=(f(·)). Indeed, this measure preserving property plays an important role in Lipschitz classification of fractal sets. In this paper, we show that such measure preserving property also holds for bi-Lipschitz maps between two Moran sets in a certain class.
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