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I am new to CFG's,
Can someone give me tips in creating CFG that generates some language

For example

L = {am bn | m >= n}

What I got is:

So -> a | aSo | aS1 | e
S1 -> b | bS1 | e

but I think this area is wrong, because there is a chance that the number of b's can be greater than a's.

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4 Answers 4

up vote 20 down vote accepted

How to write CFG with example ambn

L = {am bn | m >= n}.

Language description: am bn consist of a followed by b where number of a are equal or more then number of b.

some example strings: {^, a, aa, aab, aabb, aaaab, ab......}

So there is always one a for one b but extra a are possible. infect string can be consist of a only. Also notice ^ null is a member of language because in ^ NumberOf(a) = NumberOf(b) = 0

How to write grammar for am bn?

In the grammar, there should be a rules such that if you add a b symbol you also add a a symbol.

anf this can be done with something like:

   S --> aSb 

But this is incomplete because we need a rule to generate extra as for this rules are just below:

   A --> aA | a

Combine two production rules into a single grammar CFG.

   S --> aSb | A
   A --> aA  | a

So you can generate any string consist of a also a and b in (am bn) pattern.

But in above grammar there is no way to generate ^ string.

So, Change this grammar like this:

   S --> B   | ^
   B --> aBb | A
   A --> aA  | a

this grammar can generate {am bn | m >= n} language.

Note: to generate ^ null string, I added an extra first step in grammar by adding S--> B | ^, So you can either add ^ or your string of symbol a and b. (now B plays role of S from previous grammar to generate equal numbers of a and b)

Edit: Thanks to @Andy Hayden
You can also write equivalent grammar for same language {am bn | m >= n}:

   S --> aSb | A
   A --> aA | ^

notice: here A --> aA | ^ can generate zero or any number of a. And that should be preferable than my grammar because generate smaller parse tree for same string in language.
(smaller in height preferable because of efficient parsing)

Following tips may be helpful to write Grammar for a formal language:

  • You are to be clear about language that what it describes (meaning/patter.
  • You can remember solutions for some basic problems(on basis of that you can write new grammar).
  • You can write rules for fundamental languages like I have written for RE in this example to write Right-Linear-Grammmar. The rules will help you to write Grammar for New Languages.
  • One different approach is first draw automata, then convert automata to Grammar. We have predefined techniques to write grammar from automata form any class of formal language.
  • Like a Good Programmer learn by reading each others codes, in similarly way you can learn writing Grammar for formal languages.

Also grammar you written is wrong, even your reason is correct that why grammar is wrong

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You could have put the empty string at the end S --> aSb | A, A --> aA | ^, that way it's not a special case (and I think more intuitive). –  Andy Hayden Apr 24 '13 at 9:13

with less variables :

S -> a S b | a S | a b | e

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may be you wanted to write small 'A' and 'B' ? presently your grammar doesn't drives terminals. –  Grijesh Chauhan Apr 7 '14 at 13:53
@GrijeshChauhan please give me a example, which terminal doesn't produce ??? but you are right about ("small A and B") I corrected them. –  alireza sanaee Apr 7 '14 at 15:52
No, now it is correct grammar, and yes because of less number of variables, your grammar is better than mine :) –  Grijesh Chauhan Apr 7 '14 at 16:31

Least variables: S -> a S b | a S | e

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you want to create a grammar for following language

    L= {an bm | m>=n }

that means number of 'b' should be greater or equal then number of 'a' or you can say that for each 'b' there could at most one 'a'. not other way around.

here is grammar for this language

      S-> aSb | Sb | b | ab

in this grammar for each 'a' there is one 'b'. but b can be generated without generating any 'a'.

you can also try these languages:

           L1= {an bm | m > n }
           L2= {an bm | m >= 2n }
           L3= {an bm | 2m >= n }
           L4= {an bm | m != n }

i am giving grammar for each language.

for L1

         S-> aSb | Sb | b

for L2

         S-> aSbb | Sb | abb

for L3

         S-> AASb | Sb | aab | ab | b

for L4

        S-> S1 | S2
        S1-> aS1b | S1b | b
        S2-> aS2b | aS2 | a
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