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Most UNIX regular expressions have, besides the usual **,+,?* operators a backslash operator where \1,\2,... match whatever's in the last parentheses, so for example *L=(a*)b\1* matches the (non regular) language *a^n b a^n*.

On one hand, this seems to be pretty powerful since you can create (a*)b\1b\1 to match the language *a^n b a^n b a^n* which can't even be recognized by a stack automaton. On the other hand, I'm pretty sure *a^n b^n* cannot be expressed this way.

I have two questions:

  1. Is there any literature on this family of languages (UNIX-y regular). In particular, is there a version of the pumping lemma for these?
  2. Can someone prove, or disprove, that *a^n b^n* cannot be expressed this way?
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3 Answers

Ruby 1.9.1 supports the following regex:

regex = %r{ (?<foo> a\g<foo>a | b\g<foo>b | c) }x

p regex.match("aaacbbb")
# the result is #<MatchData "c" foo:"c">

"Fun with Ruby 1.9 Regular Expressions" has an example where he actually arranges all the parts of a regex so that it looks like a context-free grammar as follows:

sentence = %r{ 
    (?<subject>   cat   | dog   | gerbil    ){0} 
    (?<verb>      eats  | drinks| generates ){0} 
    (?<object>    water | bones | PDFs      ){0} 
    (?<adjective> big   | small | smelly    ){0} 

    (?<opt_adj>   (\g<adjective>\s)?     ){0} 

    The\s\g<opt_adj>\g<subject>\s\g<verb>\s\g<opt_adj>\g<object> 
}x

I think this means that at least Ruby 1.9.1's regex engine, which is the Oniguruma regex engine, is actually equivalent to a context-free grammar, though the capturing groups aren't as useful as an actual parser-generator.

This means that "Pumping lemma for context-free languages" should describe the class of languages recognizable by Ruby 1.9.1's regex engine.

EDIT: Whoops! I messed up, and didn't do an important test which actually makes my answer above totally wrong. I won't delete the answer, because it's useful information nonetheless.

regex = %r{\A(?<foo> a\g<foo>a | b\g<foo>b | c)\Z}x
#I added anchors for the beginning and end of the string
regex.match("aaacbbb")
#returns nil, indicating that no match is possible with recursive capturing groups.

EDIT: Coming back to this many months later, I just discovered that my test in the last edit was incorrect. "aaacbbb" shouldn't be expected to match regex even if regex does operate like a context-free grammar.

The correct test should be on a string like "aabcbaa", and that does match the regex:

regex = %r{\A(?<foo> a\g<foo>a | b\g<foo>b | c)\Z}x
regex.match("aaacaaa")
# => #<MatchData "aaacaaa" foo:"aaacaaa">
regex.match("aacaa")
# => #<MatchData "aacaa" foo:"aacaa">
regex.match("aabcbaa")
# => #<MatchData "aabcbaa" foo:"aabcbaa">
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You're probably looking for

and of course follow their citations forward and backward to find more literature on this subject.

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a^n b^n is CFL. The grammar is

A -> aAb | e

you can use pumping lemma for RL to prove A is not RL

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Yup, "regular" expressions have been extended to recognize languages that finite state machines will not recognize. –  WhirlWind Apr 13 '10 at 2:43
    
this doesn't answer the question. he wants a statement of a theorem (similar to the pumping lemma) that he can use to prove what regular expressions can support when they support backreferences. –  Ken Bloom Apr 18 '10 at 4:42
    
@ken: i believe he changed the question after I answered.... –  zsong Apr 18 '10 at 5:37
    
@ziang. The question has never been edited. –  Ken Bloom Apr 18 '10 at 17:59
    
@ken. His original question is asking why a^n b^n is CFL and how to prove it is not a RL. And WhirlWind also noticed that. You can ask Avi and you can also report to the website admin about the untracked modified thread. –  zsong Apr 18 '10 at 18:22
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