Asymptotic Density of Zimin Words
Abstract
Word W is an instance of word V provided there is a homomorphism φ mapping letters to nonempty words so that φ(V) = W. For example, taking φ such that φ(c)=fr, φ(o)=e and φ(l)=zer, we see that "freezer" is an instance of "cool". Let In(V,[q]) be the probability that a random length n word on the alphabet [q] = \1,2,·s q\ is an instance of V. Having previously shown that n → ∞ In(V,[q]) exists, we now calculate this limit for two Zimin words, Z2 = aba and Z3 = abacaba.
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