Abstract
We employ the ergodic-theoretic machinery of scenery flows to address classical geometric measure-theoretic problems on Euclidean spaces. Our main results include a sharp version of the conical density theorem, which we show to be closely linked to rectifiability. Moreover, we show that the dimension theory of measure-theoretical porosity can be reduced back to its set-theoretic version, that Hausdorff and packing dimensions yield the same maximal dimension for porous and even mean porous measures, and that extremal measures exist and can be chosen to satisfy a generalized notion of self-similarity. These are sharp general formulations of phenomena that had been earlier found to hold in a number of special cases
| Original language | English |
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| Pages (from-to) | 1248-1280 |
| Number of pages | 36 |
| Journal | London Mathematical Society. Proceedings |
| Volume | 110 |
| Early online date | 26 Mar 2015 |
| DOIs | |
| Publication status | Published - 26 Mar 2015 |