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I'm trying to find out if its possible to have an example of a CFG for which it is impossible to give a Regular Expression which can accept the same language.

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If you even know a bit about what these two are, the answer should be obvious... come on, did you even try? If so, show us. – delnan Feb 25 '11 at 16:59
This is obviously a homework question... – Jordan Ryan Moore Feb 25 '11 at 17:00
S -> { S } S S -> ε A language for balanced parenthesis seems like it would work, but I'm not sure. – pureonyx Feb 25 '11 at 17:31

2 Answers 2

Any language which requires counting/remembering can't be expressed as a regular expression.

For example, a language which checks balanced parenthesis:

S -> { S } S

S -> ε
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Since a regular machine/expression has only a limited (pre-defined) number of states, it cannot "remember" (infinitely) earlier parts of the input.

As such recognizing the following expression is impossible for a state-machine: anbn (n∈ℕ)

You could make such a machine for n ≤ x, where x∈ℕ, but no state-machine can do it for every possible value from ℕ.

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You are saying that a (finite) regular expression can't capture an infinite expression. Which is kind of a moot point, since infinte expressions doesn't exist, and if they did, they would be captured by infinite regular expressions! – Björn Lindqvist Jan 18 at 0:39
You could make a state machine that accepts $a^x b^x$ where $x=10000$, or $x=1000000$. You could not make a state machine for arbitrary $x$. You could make a stack machine/pushdownautomaton or turing machine that accepts arbitary $x$. See this link for a more detailed explanation. – dtech Jan 18 at 11:32

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