I'm trying to write a grammar for a simple language that has left recursion, but I don't really understand how.
Basically my grammar looks like this:
expr: expr('@'TYPE)? '.' ID '(' (expr ',')∗ ')' | expr '+' expr | ID | INTEGER | STRING INTEGER : ('0'..'9')+; STRING : '"' ('a'..'z' | 'A'..'Z' | '0'..'9')* '"'; TYPE : ('String' | 'Bool' | 'Int') ID : ('a'..'z' | 'A'..'Z')('a'..'z' | 'A'..'Z' | '0'..'9')*;
There is more to it but that's the important part with the left recursion I'm trying to remove.
I've been looking on the Wikipedia about it, and this is what I ended up with:
expr: function | add | ID | INTEGER | STRING function : ( ('@'TYPE)? '.' ID '(' (expr',')* ')' function)?; add : (('+' expr) add)?;
However antlr still says it's left recursive and I can't get it to recognize the language I want it to. Could anyone help me out and explain to me how to remove the left recursion?