5

Is it possible to parse an expression (without ambiguity) that can contains binary prefix, binary infix and binary postfix operators (let's assume that all the symbols are different) with precedence between them? For example:

a = 2 3 post+
b = pre+ 2 3*4

Then a would equal to 5 because = has lower precedence than the postfix post+ operator and b would be 14. I know that you can parse infix notated expressions with operator precedence parse or shunting yard but this problem seems far more complex for me.

Edit:

Parenthesis are allowed and pre/post variations of an operator have the same precedence as the infix one.

I would like to roll a hand-written algorithm.

Edit2:

By precedence I mean how much to consume. For example this:

a = 2 3 post+

Could result in these AST-s:

'=' has higher precedence than 'post+':
    post+
    /  \
   =    3
  / \
 a  2

'post+' has higher precedence than '=':
      =
     / \
   a   post+
       /  \
      2    3

(The second one is what I need in this situation). I can't really use existing parser generators or fixed grammar for operands because the operators are loaded dynamically.

  • How would you handle 2+3+4 using only pre+ and post+? I am seeking a red flag and looking at the patterns that only use pre+ and post+ with them next to each other. – Guy Coder Jan 10 '17 at 17:01
  • @GuyCoder Parenthesis are allowed. 2+3+4 could be pre+ 2 3 4 post+ – Peter Lenkefi Jan 10 '17 at 17:07
  • @GuyCoder Maybe there should be a rule that if pre+, post+ and infix + have the same precedence, then the ordrer is: pre+ first, infix next and post+ at last – Peter Lenkefi Jan 10 '17 at 17:09
  • One of the easiest ways to check this is to use a tool that check for ambiguity on a grammars such as ANTLRor use Prolog DCG and look for multiple answers. – Guy Coder Jan 10 '17 at 17:13
  • 2
    @PeterLenkefi: Now I don't understand. If the names of pre+, post+ and infix+ are really different, why does it matter what their respective precedences are? But having said that, it is impossible for a prefix operator and a postfix operator to have the "same" precedence. For simplicity, consider only unary operators, and look at the expression prefix operand postfix. Either prefix or postfix must bind more tightly. (You can handwave about associativity, but in this context that's not really useful. In the end, one of the operators binds more tightly.) – rici Jan 11 '17 at 16:14

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