Can we construct two sets E and F meeting the following criteria
$dim_H(E) = dim_H(F) = dim_H(E ∩ F)$
$dim_P(E), dim_P(F)$, and $dim_P(E ∩ F)$ are distinct?
Here $dim_H$ denotes the Hausdorff dimension and $dim_P$ denotes the packing dimension.
Fractal sets and dimensions
B-S
- 39
- 5