3

Standard methods are readily available to transform a context-free grammar which is not LL(1) into an equivalent grammar which is. Are there any tools available which can automate this process?

In the examples below I use upper-case lettering for non-terminals, and lower-case for terminals.

The following left-recursive non-terminal:

A  -> A a | b

can be transformed into a right-recursive form:

A  -> b A'
A' -> NIL | a A'

Note though that left-recursive production rules ensure that expressions associate to the left, and similarly for right recursive productions; and so a grammar modification will also change expression associativity.

Another issue is indirect left-recursion, such as the following:

A -> B a
B -> A b

Left-factoring is also used to ensure that only one look-ahead token is required by the parser. The following production must look ahead by two tokens:

A  -> a b | a c

This can also be refactored; to:

A  -> a (b | c)

Are there any software tools which can automate these grammar transformations; and so produce an equivalent grammar suitable for a LL(1) parser?

1 Answer 1

1

The Haskell grammar-combinators library here allows a grammar to be transformed into a non-left-recursive form. The input grammar must though be a parsing expression grammar.

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service and acknowledge you have read our privacy policy.

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