Automatic complexity of shift register sequences
Abstract
Let x be an m-sequence, a maximal length sequence produced by a linear feedback shift register. We show that x has maximal subword complexity function in the sense of Allouche and Shallit. We show that this implies that the nondeterministic automatic complexity AN(x) is close to maximal: n/2-AN(x)=O(2n), where n is the length of x. In contrast, Hyde has shown AN(y) n/2+1 for all sequences y of length n.
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