Classifying Rotationally-Closed Languages Having Greedy Universal Cycles
Abstract
Let T(n,k) be the set of strings of length n over the alphabet =\1,2,…,k\. A universal cycle for T(n,k) can be constructed using a greedy algorithm: start with the string kn, and continually append the least symbol possible without repeating a substring of length n. This construction also creates universal cycles for some subsets S⊂eqT(n,k); we will classify all such subsets that are closed under rotations.
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