0

For the grammar given below,what is the equivalent CFG without null productions?

S->ASB/epsilon
A->Aa/epsilon
B->bB/epsilon.
  • You will need at least one null production, because the language includes the empty string. You can remove null productions by examining how they work. For example, A yields a*. You can express aa* as A->Aa|a. Then you just need a mechanism to make A itself optional. A is specified in S, so you can remove it from there in one of the productions: S->ASB|SB|epsilon. – Welbog May 13 at 13:28
0

The rule is that if X := epsilon, we can change any production Y := rXs into Y := rXs | rs and eliminate the production X := epsilon. Let's see how that works in your case. First, we can to S.

S -> ASB | epsilon … becomes … S -> ASB | AB
A -> Aa | epsilon
B -> bB | epsilon

Now we do A:

S -> ASB | AB … becomes … S -> ASB | SB | AB | B
A -> Aa | epsilon … becomes … A -> Aa | a
B -> bB | epsilon

Now we do B:

S -> ASB | SB | AB | B … becomes … S -> ASB | AS | SB | AB | A | B | epsilon
A -> Aa | a
B -> bB | b

We can't get rid of S -> epsilon since the empty string is generated by the input grammar.

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.