This doesn't exactly answer your question, but hopefully explains a little why a simple answer is hard to come by:

First, the term 'regex' is a bit murky, so just to clarify, we have:

- "Strict" regular expressions, which are equivalent to deterministic finite automatons (DFAs).
- Perl-compatible regular expressions (PCREs), which add a bunch of bells and whistles such as lookaheads, backreferences, etc. These are implemented in other languages too, such as Python and Java.
- Actual Perl regular expressions, which can get even more crazy, including arbitrary Perl code, via the
`?{...}`

construct.

I think this problem is solvable for strict regular expressions. You just construct the corresponding DFA and search that graph to see if there's any path to a non-accept state. But that doesn't help for 'real world' regex, which is usually PCRE.

I don't think PCRE is Turing-complete (though I don't know - see this question, too: Are Perl regexes turing complete?). If it were, then I think as Jim Garrison commented, this is basically the halting problem.
That said, it's not easy to transform them into a DFA, either, making the above method useless...

I don't have an answer for PCREs, but be aware that the aforementioned constructs (backreferences, etc) would make it pretty hard, I imagine. Though I hesitate to say "impossible."

A genuine Perl regex with `?{...}`

in it is definitely Turing-complete, so there be dragons, and I think you're out of luck.

`.*`

– Jim Garrison Jul 30 '13 at 18:30If, given a CSG, we can produce a string of this language by substituting the rules, then we may apply a forbidden substitution, thus producing a string that is not in our language. Sadly I don't know whether this is the case, and I wouldn't be able to sketch a proof of this. – amon Jul 30 '13 at 19:47