Normal Sequences with Non-Maximal Automatic Complexity
Abstract
This paper examines Automatic Complexity, a complexity notion introduced by Shallit and Wang in 2001. We demonstrate that there exists a normal sequence T such that I(T) = 0 and S(T) ≤ 1/2, where I(T) and S(T) are the lower and upper automatic complexity rates of T respectively. We furthermore show that there exists a Champernowne sequence C, i.e. a sequence formed by concatenating all strings of length 1 followed by concatenating all strings of length 2 and so on, such that S(C) ≤ 2/3.
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