Call a unary language an arithmetic progression if it is


Answer the following question and also justify your answers with appropriate examples

Question: Call a unary language an arithmetic progression if it is the set {\(x^{m+ni}\)} : i >= 0 for some m and n show that if a unary language is regular , then it is the union of a finite set and a finite number of arithmetic progressions

 

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Computer Engineering: Call a unary language an arithmetic progression if it is
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