The Number of Threshold Words on $n$ Letters Grows Exponentially for Every $n\geq 27$

Published 13 Nov 2019 in math.CO and cs.DM | (1911.05779v1)

Abstract: For every $n\geq 27$, we show that the number of $n/(n-1)^+$-free words (i.e., threshold words) of length $k$ on $n$ letters grows exponentially in $k$. This settles all but finitely many cases of a conjecture of Ochem.

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The Number of Threshold Words on $n$ Letters Grows Exponentially for Every $n\geq 27$

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The Number of Threshold Words on $n$ Letters Grows Exponentially for Every $n\geq 27$

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