Cyclic language

In computer science, more particularly in formal language theory, a cyclic language is a set of strings that is closed with respect to repetition, root, and cyclic shift.

Definition

If A is a set of symbols, and A^* is the set of all strings built from symbols in A, then a string set L ⊆ A^* is called a formal language over the alphabet A.
The language L is called cyclic if

∀w∈A^*. ∀n>0. w ∈ L ⇔ wⁿ ∈ L, and
∀v,w∈A^*. vw ∈ L ⇔ wv ∈ L,

where wⁿ denotes the n-fold repetition of the string w, and vw denotes the concatenation of the strings v and w.

Examples

For example, using the alphabet A =, the language
is cyclic, but not regular.
However, L is context-free, since M = is, and context-free languages are closed under circular shift; L is obtained as circular shift of M.

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