# Build a binary tree from an infix expression without using a stack

Recently I wrote an algorithm to `convert an infix expression to a binary tree without using any stack`. However, as I search on web, I find the algorithms described there are all based on stack(or recursion).

So I begin to worry about the correctness about my algorithm, though I cannot prove it's incorrect yet.

Question

Do you know whether it's technically possible to convert it without any stack or not? Is my algorithm wrong?

Short description

It's based on:

1. An operand in an infix expression belongs to either the right child of the operator in front of it, or the left child of the operator behind it.

2. If an operator `OP2` has higher precedence than its preceding operator `OP1`, the previous operand `x` becomes the left child of `OP2`, and `OP2` becomes the right child of `OP1`.

3. If an operator `OP2` has lower precedence than its preceding operator `OP1`, the previous operand `x` becomes the right child of `OP1`. Go up the tree from `OP1`, compare the precedence of each ancestor of `OP1` with that of `OP2` until `OP2` <= ancestor `OP`. Then `OP2` becomes the right child of `OP`.

The program

``````#include <iostream>
#include <string>
#include <sstream>
#include <cassert>

using namespace std;

typedef struct Node{
// store operator or operand
string data;
// only valid for operator
int precedence;
struct Node* parent;
struct Node* left;
struct Node* right;
}CNode, *PNode;

PNode CreateNode(const string& x)
{
PNode p = new CNode;
p->parent = p->left = p->right = NULL;
p->data = x;
return p;
}

bool IsOperator(const string& x)
{
// Since the only impact of parentheses () is on precedence,
// they are not considered as operators here
return ((x.length() == 1) &&
(x[0] == '*' ||
x[0] == '/' ||
x[0] == '+' ||
x[0] == '-'));
}

bool IsLeftParenthesis(const string& x)
{
return x == "(";
}

bool IsRightParenthesis(const string& x)
{
return x == ")";
}

bool IsOperand(const string& x)
{
int y;
stringstream ss(x);
if (ss >> y) return true;
else return false;
}

int GetPrecedence(const string& x)
{
assert(IsOperator(x));
if (x[0] == '*' || x[0] == '/') return 2;
else return 1;
}

PNode CreateInfixTree(const string& exp)
{
// create a dummy root with minimal precedence
// its content is trivial
PNode root = CreateNode("0");
root->precedence = INT_MIN;

// the previous operand of current operator
PNode preOperand = NULL;
// the previous operator of current operator
PNode preOperator = root;
// the impact of preceding parenthesis, if any
int correction = 0;

string token;
stringstream ss(exp);

while (ss >> token)
{
if (IsOperand(token))
{
preOperand = CreateNode(token);
}
else if (IsOperator(token))
{
PNode p = CreateNode(token);
p->precedence = GetPrecedence(token) + correction;
if (p->precedence > preOperator->precedence)
{
p->left = preOperand;
preOperator->right = p;
p->parent = preOperator;
}
else
{
preOperator->right = preOperand;
PNode q = preOperator->parent;
while (p->precedence <= q->precedence) q = q->parent;

p->left = q->right;
q->right = p;
p->parent = q;
}
preOperand = NULL;
preOperator = p;

}//else if (IsOperator(token)
else if (IsLeftParenthesis(token))
{
correction += 2;
}
else if (IsRightParenthesis(token))
{
correction -= 2;
}
else
{
cout << "illegal token found: " << token << endl;
break;
}
}//while

if (preOperand == NULL)
cout << "illegal expression: cannot end with operator: "
<< preOperator->data << endl;
else preOperator->right = preOperand;

// delete dummy root
PNode realRoot = root->right;
delete root;
if (realRoot) realRoot->parent = NULL;
return realRoot;
}

void PostOrderPrintTree(PNode node)
{
if (node)
{
PostOrderPrintTree(node->left);
PostOrderPrintTree(node->right);
cout << node->data << " ";
}
}

int main()
{
// valid operators: + - * / ( )
// valid operands: integers
// whitespace separated as: ( 1 + 2 ) * 3
string exp;
getline(cin, exp);
PNode root = CreateInfixTree(exp);
PostOrderPrintTree(root);
cout << endl;
}
``````
-
Just as something to watch for, if you have an illegal expression, your algorithm will just keep going. –  Seth Carnegie Aug 7 '11 at 15:02
Also, this is pretty cool. From what you know of the algorithm, can it be made to handle unary operators and stuff? –  Seth Carnegie Aug 7 '11 at 15:06
@Seth, right, I didn't handle illegal expression too much at this phrase. For now it only supports binary operators and parenthesis though. –  Eric Z Aug 7 '11 at 15:16
This is not C++ code, this is C code with a very small C++ coat. –  Sjoerd Aug 7 '11 at 15:25
@Sjoerd and there's nothing wrong with that. –  Seth Carnegie Aug 7 '11 at 15:25
``````while (p->precedence <= q->precedence) q = q->parent;