论文信息 - Non-Uniqueness and Radius of Cyclic Unary NFAs

Non-Uniqueness and Radius of Cyclic Unary NFAs

In this paper we study some properties of cyclic unary regular languages. We find a connection between the uniqueness of the minimal NFA for certain cyclic unary regular languages and a Diophantine equation studied by Sylvester. We also obtain some results on the radius of unary languages. We show that the nondeterministic radius of a cyclic unary regular language L is not necessarily obtained by any of the minimal NFAs for L. We give a class of examples which demonstrates that the nondeterministic radius of a regular language cannot necessarily even be approximated by the minimal radius of its minimal NFAs.

Jeffrey Shallit | Michael Domaratzki | Ming-wei Wang | Keith Ellul

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