Abstract
We exploit dynamical properties of diagonal actions to derive results in Diophantine approximations. In particular, we prove that the continued fraction expansion of almost any point on the middle third Cantor set (with respect to the natural measure) contains all finite patterns (hence is well approximable). Similarly, we show that for a variety of fractals in [0,1]2, possessing some symmetry, almost any point is not Dirichlet improvable (hence is well approximable) and has property C (after Cassels). We then settle by similar methods a conjecture of M. Boshernitzan saying that there are no irrational numbers x in the unit interval such that the continued fraction expansions of {nx mod 1}n∈N are uniformly eventually bounded.
| Original language | English |
|---|---|
| Pages (from-to) | 14-35 |
| Number of pages | 22 |
| Journal | Geometric and Functional Analysis |
| Volume | 21 |
| Issue number | 1 |
| DOIs | |
| State | Published - 1 Mar 2011 |
| Externally published | Yes |
Keywords
- 11J13
- 37A17
- 37A35
- Applications of measure rigidity 2010 mathematics subject classification: 11J70
- Diophantine approximations
- Fractals
ASJC Scopus subject areas
- Analysis
- Geometry and Topology