Approximating elements of the middle third Cantor set with dyadic rationals
Abstract
Let C be the middle third Cantor set and μ be the 2 3-dimensional Hausdorff measure restricted to C. In this paper we study approximations of elements of C by dyadic rationals. Our main result implies that for μ almost every x∈ C we have \#\1≤ n≤ N:|x-p2n| ≤ 1n0.01· 2n for some p∈N\ 2Σn=1Nn-0.01. This improves upon a recent result of Allen, Chow, and Yu which gives a sub-logarithmic improvement over the trivial approximation rate.
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