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Recall that two strings u and v are ANAGRAMS if the letters of one can be rearranged to form the other, or, equivalently, if they contain the same number of each letter. If L is a language, we define its ANAGRAM CLOSURE AC(L) to be the set of all strings that have an anagram in L. Prove that the set of regular languages is _not_ closed under this operation. That is, find a regular language L such that AC(L) is not regular. (We’re now allowed to use Kleene’s Theorem, so you just need to show that AC(L) is not recognizable.)

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kendrich

Answer:

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Explanation:

Kleene's Theorem states that, in fact, these classes are the same: every regular language may be recognized by some FA, and every FA language may be represented using a regular expression.

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