Prefixes of the Fibonacci word
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Mignosi, Restivo, and Salemi (1998) proved that for all ϵ > 0 there exists an integer N such that all prefixes of the Fibonacci word of length ≥ N contain a suffix of exponent α^2-ϵ, where α = (1+√(5))/2 is the golden ratio. In this note we show how to prove an explicit version of this theorem with tools from automata theory and logic. Along the way we gain a better understanding of the repetitive structure of the Fibonacci word.
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