Abstract
The initial non-repetitive complexity function of an infinite word x (first introduced by Moothathu) is the function of n that counts the number of distinct factors of length n that appear at the beginning of x prior to the first repetition of a length-n factor. We examine general properties of the initial non-repetitive complexity function, as well as obtain formulas for the initial non-repetitive complexity of the Thue–Morse word, the Fibonacci word and the Tribonacci word.
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