Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

I would like to parse both f(arg).method and f(arg) as block_statement; the first has more priority than the latter.

The following elements in parser.mly can't parse f(arg), but can parse f(arg).method as follows:

  (* f(arg).method *)
  BS_MAE MAE_LE_UN (
    LE_IE IE_LE_AL (
      LE_SNE SNE_I f,
      AL_I arg),
    UN_I method)

(* parser.mly: *)

block_statement:
| member_access_expression { BS_MAE $1 }

simple_name_expression: | IDENTIFIER { SNE_I $1 }
member_access_expression: | l_expression DOT unrestricted_name { MAE_LE_UN ($1, $3) }
unrestricted_name: | IDENTIFIER { UN_I $1 }
index_expression: | l_expression LPAREN argument_list RPAREN { IE_LE_AL ($1, $3) }
expression: | l_expression { E_LE $1 }

l_expression:
| simple_name_expression { LE_SNE $1 } 
| index_expression { LE_IE $1 } 

call_statement: 
| simple_name_expression argument_list { CallS_SNE_AL ($1, $2) }
| member_access_expression argument_list { CallS_MAE_AL ($1, $2) }

argument_list: | IDENTIFIER { AL_I $1 }

But if we append another line | IDENTIFIER LPAREN expression RPAREN { BS_I_E ($1, $3) } for block_statement, this time it can parse f(arg) as follows:

  BS_I_E (
    f,
    E_LE LE_SNE SNE_I arg)

However, this time, f(arg).method can't be parsed anymore. It raises an error after reading .

I don't know how to let the parser go a little bit further to read f(arg).method as a whole if possible; I really need the parser to parse both of the statements... Could anyone help?

share|improve this question
up vote 1 down vote accepted

I would try a grammar with a structure along the lines of:

block:
| expr

expr:
| expr LPAREN argument_list RPAREN
| expr DOT unrestricted_name
| simple_expr

simple_expr:
| IDENTIFIER

Note that if you want to parse a full sentence, and not just a valid prefix of the input, your toplevel rule should request the EOF token to be present (to force the parser to go to the end of the input):

%start <block> main

main:
| b=block EOF { b }
share|improve this answer
    
Thank you :-)... Are you sure that f(arg).method could be well parsed? .method must be read as DOT unrestricted_name, thus f(arg) must be read as member_access_expr, but it is only the other branch of call_expr which contains parentheses... – SoftTimur Jan 24 '14 at 23:25
    
Indeed, I started with something parsing your example, made a change, and the resulting grammar was wrong. I updated it to conflate the two levels to allow parsing. Note that you have to have a top parsing rule that goes upto EOF (otherwise you may get a prefix of the input that is a valid parse), and that f(x).y(z) will get parsed as (f(x).y)(z), as I supposed it should be. – gasche Jan 25 '14 at 12:08
    
Could you please elaborate a little bit more about you have to have a top parsing rule that goes upto EOF (otherwise you may get a prefix of the input that is a valid parse)? Besides, I don't see EOF in your grammar either... I guess that is the key to solve my problem: according to my grammar f(arg).method can't be parsed because f(arg) as a prefix is a valid parse... – SoftTimur Jan 26 '14 at 3:14
    
I edited my answer to add an example of EOF requirement. – gasche Jan 26 '14 at 12:36
    
Actually, the problem is my whole grammar is complex (I have already removed lots of branches to make this representative in this post) and it is not LR(1), thus it is not easy to restructure it... But I still have to modify it to increase the programs it deal with... I have found another way to treat the specific problem of this post by making subsets of identifiers, but there is another problem I post here... – SoftTimur Jan 27 '14 at 16:39

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

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