# Convert regular expression to CFG

How can I convert some regular language to its equivalent Context Free Grammar? Is it necessary to construct the DFA corresponding to that regular expression or is there some rule for such a conversion?

For example, consider the following regular expression

01+10(11)*

How can I describe the grammar corresponding to the above RE?

-

• Change A+B to grammar

``````G -> A
G -> B
``````
• Change A* to

``````G -> (empty)
G -> A G
``````
• Change AB to

``````G -> AB
``````

and proceed recursively on A and B. Base cases are empty language (no productions) and a single symbol.

`````` A -> 01
A -> 10B
B -> (empty)
B -> 11B
``````

If the language is described by finite automaton:

• use states as nonterminal symbols
• use language as set of terminal symbols
• add a transition p -> aq for any transition p -> q on letter a in the original automaton
• use initial state as initial symbol in the grammar
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Why is B -> 11 instead of B -> B11? – Sidsec9 Dec 16 '14 at 23:19
@Sidsec9: My mistake, thanks. – sdcvvc Dec 20 '14 at 23:32

I guess you mean convert it to a formal grammar with rules of the form V->w, where V is a nonterminal and w is a string of terminals/nonterminals. To start, you can simply say (mixing CFG and regex syntax):

``````S -> 01+10(11)*
``````

Where S is the start symbol. Now let's break it up a bit (and add whitespace for clarity):

``````S -> 0 A 1 0 B
A -> 1+
B -> (11)*
``````

The key is to convert `*`es and `+`es to recursion. First, we'll convert the Kleene star to a plus by inserting an intermediate rule that accepts the empty string:

``````S -> 0 A 1 0 B
A -> 1+
B -> (empty)
B -> C
C -> (11)+
``````

Finally, we'll convert `+` notation to recursion:

``````S -> 0 A 1 0 B
A -> 1
A -> A 1
B -> (empty)
B -> C
C -> 11
C -> C 11
``````

To handle `x?`, simply split it into a rule producing empty and a rule producing x .

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Actually, different CFG grammars can produce the same language. So given a regular expression (regular language), its mapping back a CFG is not unique.

Definitely, you can construct a CFG that result in a given regular expression. The above answers shown some ways to achieve this.

Hope this gives you a high level idea.

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