Dimension 1 sequences are close to randoms
Abstract
We show that a sequence has effective Hausdorff dimension 1 if and only if it is coarsely similar to a Martin-L\"of random sequence. More generally, a sequence has effective dimension s if and only if it is coarsely similar to a weakly s-random sequence. Further, for any s<t, every sequence of effective dimension s can be changed on density at most H-1(t)-H-1(s) of its bits to produce a sequence of effective dimension t, and this bound is optimal.
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