Brik's sequence: a strange recursion
Abstract
We study the properties of the sequence of words (Bi), where B1 = 101 and Bi+1 = Bi Ci for i ≥ 1, where Ci is Bi with the first i symbols removed, and the infinite binary sequence b = 10101101011011101 ·s of which all the Bi are prefixes. We show that b is recurrent, but not uniformly recurrent; it has exponential factor complexity; it is not morphic; and the density of 1's exists and is transcendental.
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