Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

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?

share|improve this question

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):


share|improve this answer
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.

share|improve this answer
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

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.