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I've been thinking about the following and I think the answer's in the affirmative.

Is it true that every subset of a DFA-acceptable language that is regular is also DFA-acceptable?

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2 Answers 2

up vote 1 down vote accepted

No. Counterexample: Alphabet is numbers digits. DFA accepts all natural numbers. Subset: DFA accepts all prime numbers.

Edit: Alphabet is digits. Sorry, wrong terminology there.

Natural numbers can be expressed as a regular language (and therefore a DFA can be constructed for them):

0|([1-9][0-9]*)

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Actually, neither of the languages you mention are regular. Both are infinite; the language of prime numbers is not regular, as there is no DFA that could accept it. –  Marcin Jan 23 '12 at 16:33
    
@Marcin You're forgetting that regular expressions actually can express infinite strings, such as [0-9]*. –  bdares Jan 23 '12 at 17:17
    
No. That expresses that there is no upper bound on the length of word that can be accepted; however, to be accepted, some accepting state must be reached after which there are no more elements in the word. Further, this is not the same thing as having an infinite alphabet. –  Marcin Jan 23 '12 at 17:22
    
@Marcin you're right, I can't have an alphabet of all numbers. I've corrected my answer. –  bdares Jan 23 '12 at 17:30

All finite automata -- deterministic as well as nondeterministic -- can be represented as a regular language and vice versa. If the subset of a language is regular, then yes it can be represented as a DFA.

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I don't believe this answers the question. The question is whether all subsets of a regular language must also be regular, which is false and not addressed here. –  templatetypedef Dec 8 '13 at 19:18
    
The key point here is: A subset of a regular language is not guaranteed to be regular. –  sorush-r Dec 25 '13 at 21:34

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