Abstract
We investigate (local) Minkowski measurability of C 1+α 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.
| Original language | English |
|---|---|
| Pages (from-to) | 307-325 |
| Number of pages | 19 |
| Journal | Geometriae Dedicata |
| Volume | 159 |
| Issue number | 1 |
| DOIs | |
| Publication status | Published - Aug 2012 |
Keywords
- Conformal iterated function system
- Fractal curvature measures
- Minkowski content
- Self-conformal set
ASJC Scopus subject areas
- Geometry and Topology