Repetition avoidance in products of factors
Abstract
We consider a variation on a classical avoidance problem from combinatorics on words that has been introduced by Mousavi and Shallit at DLT 2013. Let pexpi(w) be the supremum of the exponent over the products of i factors of the word w. The repetition threshold RTi(k) is then the infimum of pexpi(w) over all words w∈ωk. Mousavi and Shallit obtained that RTi(2)=2i and RT2(3)=134. We show that RTi(3)=3i2+14 if i is even and RTi(3)=3i2+16 if i is odd and i3.
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