I've been thinking about the following and I think the answer's in the affirmative.
Is it true that every subset of a DFAacceptable language that is regular is also DFAacceptable?

No. Counterexample: Alphabet is 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):



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. 

