Mathematics – Dynamical Systems
Scientific paper
2011-09-18
Mathematics
Dynamical Systems
The final publication is available at http://www.springerlink.com
Scientific paper
10.1007/s10711-011-9661-5
We investigate (local) Minkowski measurability of $\mathcal C^{1+\alpha}$ images of self-similar sets. We show that (local) Minkowski measurability of a self-similar set $K$ implies (local) Minkowski measurability of its image $F$ and provide an explicit formula for the (local) Minkowski content of $F$ in this case. A counterexample is presented which shows that the converse is not necessarily true. That is, $F$ can be Minkowski measurable although $K$ is not. However, we obtain that an average version of the (local) Minkowski content of both $K$ and $F$ always exists and also provide an explicit formula for the relation between the (local) average Minkowski contents of $K$ and $F$.
Freiberg Uta
Kombrink Sabrina
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