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This is an exercise of compiler. We are asked if it's possible to match the following patterns with regular expression or context free grammar:

  1. n 'a' followed by n 'b', like 'aabb'
  2. palindrome, like 'abbccbba'
  3. n 'a', then n 'b', then n 'c', like 'aabbcc'

Note that n could be any positive integer. (Otherwise it's too simple)

Only 3 character 'abc' could appear in the text to parse.

I'm confused because as far as I can see, non of these patterns can be described by regular expression and context free grammar.

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I thought he meant n as a variable. n number of a's followed by that same number of b's.. Otherwise it'd be friggen easy. –  Mike Christensen Oct 28 '11 at 16:53
    
Well, my initial thoughts are this requires a parser and not regex. Regex is the sledge hammer to a finishing nail approach to this, IMHO. (And maybe the prof is like me: tired of seeing regex being the 1st solution and not the last resort/used when it's needed to not because it's desired) –  Brad Christie Oct 28 '11 at 17:01
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2 Answers

up vote 1 down vote accepted

The critical question is: how much and what kind of memory do you need?

In the case of problem 1, you need to somehow keep track of the number of a terminals as you are parsing the b terminals. Since you know you need one for one, a stack is clearly sufficient (you can put the a on the stack and pop one off with every b). Since a pushdown automaton is equivalent to a CFG in expressive power, you can create a CFG for problem 1.

In the case of problem 2, the technique that a PDA uses in problem 1 should be suggestive of a technique you could use for problem 2. PDAs can build a stack of the first half of the input, then pop it off as its reverse comes in.

In the case of problem 3, if you use the stack technique for counting the number of a terminals and b terminals, that's all well and good, but what happened to your stack memory? Was it sufficient? No, you would have needed to store the number of as somewhere else, so a CFG cannot express this grammar.

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Here's an attempt at a simple CFG for problem 2 (it validates an empty input, but you'll get the idea):

S -> a S a
S -> b S b
S -> c S c
S -> ɛ
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If you use two nonterminals, you can fix that: S -> a T a, S -> b T b, S -> c T c, T -> S, T -> (empty) –  Platinum Azure Oct 28 '11 at 17:09
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