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Hausdorff dimension, box dimension, packing dimension and similar concepts.

4 votes
Accepted

Random Cantor sets on the unit interval

Like the classical Cantor set, your set has a natural representation $C=\bigcap C_n$, where $C_1\supseteq C_2\supseteq C_3\supseteq\ldots$, and each $C_n$ is a disjoint union of $2^{n-X_n}$ intervals …
Christian Remling's user avatar
20 votes
Accepted

A set whose Hausdorff dimension gradually changes?

I assume you want a set $A\subseteq [0,1]$ such that $\dim (A\cap [0,x])=x$ for all $x$. We can define $A_1$ by taking the union of a (Borel) subset of dimension $0$ of $[0,1/2]$ with a subset of dime …
Christian Remling's user avatar