Parsing expression into list

I am given an expression using parantheses and +'s, such as (((a+b)+c)+(d+e)).

I need to find the parse tree of this, and then print the list form of this parse tree like: [ [ [a, b], c ], [d, e] ]

I was thinking I'd use something like ast, then ast2list. However, due to my not fully understanding these, I am repeatedly getting syntax errors. This is what I have:

``````import ast
import parser

a = ast.parse("(((a+b)+c)+(d+e))", mode='eval')
b = parser.ast2list(a)

print(b)
``````

Could anyone guide me in the right direction? Thanks.

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if it's just parentheses and +, why not just do string substitution and then evaluate the string as a list? –  Colleen Oct 12 '12 at 23:24
Just out of curiosity, what should you get if the expression were `(((a+b)+c)+(d+e+f))`? Is it okay to give `[ [ [a, b], c ], [d, e, f] ]`, or should binary expressions all return operand pairs as in `[ [ [a, b], c ], [ [ d, e ], f] ]`? –  Paul McGuire Oct 13 '12 at 3:02

This is a simple enough problem that you could just write a solution from scratch. This assumes that all variable names are one-character long, or that the expression has been correctly converted into a list of tokens. I threw in checks to make sure all parenthesis are matched; obviously you should swap out `CustomError` for whatever exception you want to throw or other action you want to take.

``````def expr_to_list(ex):
tree = []
stack = [tree]
for c in ex:
if c == '(':
new_node = []
stack[-1].append(new_node)
stack.append(new_node)
elif c == '+' or c == ' ':
continue
elif c == ')':
if stack[-1] == tree:
raise CustomError('Unmatched Parenthesis')
stack.pop()
else:
stack[-1].append(c)
if stack[-1] != tree:
raise CustomError('Unmatched Parenthesis')
return tree
``````

Tested:

``````>>> expr_to_list('a + (b + c + (x + (y + z) + (d + e)))')
['a', ['b', 'c', ['x', ['y', 'z'], ['d', 'e']]]]
``````

And for multi-character variable names, using a regex for tokenization:

``````>>> tokens = re.findall('\(|\)|\+|[\w]+',
'(apple + orange + (banana + grapefruit))')
>>> tokens
['(', 'apple', '+', 'orange', '+', '(', 'banana', '+', 'grapefruit', ')', ')']
>>> expr_to_list(tokens)
[['apple', 'orange', ['banana', 'grapefruit']]]
``````
-

Colleen's comment can be realized with something like:

``````str = "(((a+b)+c)+(d+e))"

replacements = [
('(','['),
(')',']'),
('+',','),
# If a,b,c,d,e are defined variables, you don't need the following 5 lines
('a',"'a'"),
('b',"'b'"),
('c',"'c'"),
('d',"'d'"),
('e',"'e'"),
]

for (f,s) in replacements:
str = str.replace(f,s)

obj = eval(str)

print(str)       # [[['a','b'],'c'],['d','e']]
print(obj)       # [[['a', 'b'], 'c'], ['d', 'e']]
# You can access the parsed elements as you would any iterable:
print(obj[0])    # [['a', 'b'], 'c']
print(obj[1])    # ['d', 'e']
print(obj[1][0]) # d
``````
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That's definitely one approach, and I appreciate the response. I may use this method if I can't figure out the parsing, but I would prefer using the parsing approach if I can! Thanks –  Jakemmarsh Oct 12 '12 at 23:35
+1 for the simple approach here. –  CppLearner Oct 13 '12 at 2:40
Since `str` is the name for a built-in type, you might use a different variable name. –  senderle Oct 13 '12 at 12:36

I would make a translater too. Doing it via ast was bit cumbersome to implement for this purpose.

``````[tw-172-25-24-198 ~]\$ cat a1.py
import re

def one_xlat(match):
return rx.sub(one_xlat, text)

# Closure based approach
def make_xlat(*args, **kwds):
def one_xlat(match):
def xlat(text):
return rx.sub(one_xlat, text)
return xlat

if __name__ == "__main__":
text = "((a+b)+c+(d+(e+f)))"
"+":",",
"(":"[",
")":"]",
}
print translate(text)
``````

Should give

``````[[a,b],c,[d,[e,f]]]
``````

Note - I have been having this snippet in my collections. It is from Python Cookbook. It does multiple replacements on the string, with the replacement key and values in the dictionary in a single pass.

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If ast was too difficult, is ast the only approach to do it in a method that utilizes parsing? –  Jakemmarsh Oct 12 '12 at 23:51
Ast is doing more than parsing. I should not have said too difficult. It is doing parsing and constructing the code tree for it's purposes of generating code object. The way to do it in using ast might be, created the nodes, visit each node and transform the node. help(ast) gives the example of NodeVisitor. –  Senthil Kumaran Oct 12 '12 at 23:56

Look at the docs for the ast module here where the `NodeVisitor` class is described.

``````import ast
import sys

class MyNodeVisitor(ast.NodeVisitor):
op_dict = {
ast.Sub : '-',
ast.Mult : '*',
}

type_dict = {
ast.BinOp: lambda s, n: s.handleBinOp(n),
ast.Name: lambda s, n: getattr(n, 'id'),
ast.Num: lambda s, n: getattr(n, 'n'),
}

def __init__(self, *args, **kwargs):
ast.NodeVisitor.__init__(self, *args, **kwargs)
self.ast = []

def handleBinOp(self, node):
return (self.op_dict[type(node.op)], self.handleNode(node.left),
self.handleNode(node.right))

def handleNode(self, node):
value = self.type_dict.get(type(node), None)
return value(self, node)

def visit_BinOp(self, node):
op = self.handleBinOp(node)
self.ast.append(op)

def visit_Name(self, node):
self.ast.append(node.id)

def visit_Num(self, node):
self.ast.append(node.n)

def currentTree(self):
return reversed(self.ast)

a = ast.parse(sys.argv[1])
visitor = MyNodeVisitor()
visitor.visit(a)
print list(visitor.currentTree())
``````

Looks like this:

`````` \$ ./ast_tree.py "5 + (1 + 2) * 3"
[('+', 5, ('*', ('+', 1, 2), 3))]
``````

Enjoy.

-
Your implementation prints out all the object locations, rather than an expression. How would I convert the results of ast.walk? –  Jakemmarsh Oct 13 '12 at 0:01
No, `ast.walk()` returns a generator. Each time the generator is run it returns the next item in the parse tree. It is now your job to decide which object you care about. This is why I suggested you look at implementing a `NodeVisitor()`. You can store the parts of the tree you want, a list, whatever in the visitor object and look at it after `visit()` returns. –  Sean Perry Oct 13 '12 at 0:05

If you really want to do a parser, start by not writing any code, but by understanding how your grammar should work. Backus-Naur Format or BNF is the typical notation used to define your grammar. Infix notation is a common software engineering parsing topic, and the basic BNF structure for infix notation goes like:

``````letter ::= 'a'..'z'
operand ::= letter+
term ::= operand | '(' expr ')'
expr ::= term ( '+' term )*
``````

The key is that `term` contains either your alphabetic operand or an entire subexpression wrapped in ()'s. That subexpression is just the same as the overall expression, so this recursive definition takes care of all the parenthesis nesting. The expression then is a term followed by zero or more terms, added on using your binary '+' operator. (You could expand `term` to handle subtraction and multiplication/division as well, but I'm not going to complicate this answer more than necessary.)

Pyparsing is a package that makes it easy to translate a BNF to a working parser using Python objects (Ply, spark, and yapps are other parsers, which follow the more traditional lex/yacc model of parser creation). Here is that BNF implemented directly using pyparsing:

``````from pyparsing import Suppress, Word, alphas, Forward, Group, ZeroOrMore

LPAR, RPAR, PLUS = map(Suppress, "()+")
operand = Word(alphas)

# forward declare our overall expression, necessary when defining a recursive grammar
expr = Forward()

# each term is either an alpha operand, or an expr in ()'s
term = operand | Group(LPAR + expr + RPAR)

# define expr as a term, with optional '+ term's
expr << term + ZeroOrMore(PLUS + term)

# try it out
s = "(((a+b)+c)+(d+e))"
print expr.parseString(s)
``````

giving:

``````[[[['a', 'b'], 'c'], ['d', 'e']]]
``````

Infix notation with recognition of precedence of operations is a pretty common parser, or part of a larger parser, so pyparsing includes a helper builtin call `operatorPrecedence` to take care of all the nesting/grouping/recursion, etc. Here is that same parser written using `operatorPrecedence`:

``````from pyparsing import operatorPrecedence, opAssoc, Word, alphas, Suppress

# define an infix notation with precedence of operations
# you only define one operation '+', so this is a simple case
operand = Word(alphas)
expr = operatorPrecedence(operand,
[
('+', 2, opAssoc.LEFT),
])

print expr.parseString(s)
``````

giving the same results as before.

More detailed examples can be found online at the pyparsing wiki - the explicit implementation at fourFn.py and the operatorPrecedence implementation at simpleArith.py.

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