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I have a data structure that uses a template class such that it can store any data type - ints, floats, strings, etc.

Because the data will be organized, I need a way to compare two values. Usually I can use > or <, but in the case of strings that will not work because using the >/< operators on a string won't tell me which comes first alphabetically. For that, I need to use the compare() function.

However since the data structure is a template class, I can't tell it to use the compare() function because it won't recognize the compare() function for anything BUT a string.

As a work-around, I tried writing two compare functions:

template (class t)
int BinaryTree<T>::compareVals(T v1, T v2); 

and

template (class t)
int BinaryTree<T>::compareVals(string v1, string v2);

So that in the case of the value being a string type, the program would use the method with the compare() function in it.

However trying to do that, I am getting a compiler error basically telling me I can't overload the function.

So I'm out of ideas. How can I make this template class correctly compare and sort strings as well as numbers?

Thank you very much for your input!

Here is the entire class, for reference:

#ifndef binarytree_class
#define binarytree_class

#include <iostream>
#include <string>
#include <vector>

using std::cout; 
using std::string;
using std::vector;

template <class T>
class BinaryTree{
    public:
        struct TreeNode{
            TreeNode * leftChild, 
                     * rightChild;
            T key;
            vector<T> data;
            int size;
        };

        BinaryTree();
        ~BinaryTree();
        bool isEmpty();
        int getSize();
        void add(T key, T data);
        void remove(T key);
        int getHeight();
        bool keyExists(T key);
        int getKeyHeight(T key);
        void displayAll();                    

    private: 
        int size;
        TreeNode * root;

        TreeNode * findParent(TreeNode * start, TreeNode * child); //finds the parent node of child in subtree starting at root start
        TreeNode * findNode(TreeNode * node, T input); //find node with data input in subtree at root node
        TreeNode * findMin(TreeNode * node);     
        void removeNode(TreeNode * node);      //Small part of algorithm (case: 2 children) borrowed from tech-faq.com/binary-tree-deleting-a-node.html
        void displaySubTree(TreeNode * node);  //displays subtree starting at node
        void sortAdd(TreeNode * eNode, TreeNode * nNode);  //adds a new node nNode to subtree starting at root eNode  
        void destroySubTree(TreeNode * node);  //destroys subtree starting at node. 
        void display(TreeNode * node, string indent, bool last); //Algorithm borrowed from http://stackoverflow.com/questions/1649027/how-do-i-print-out-a-tree-structure
        char leftOrRight(TreeNode * eNode, TreeNode * nNode); //compares keys in existing node vs new node and returns L or R
        int calcHeight(TreeNode * node, int depth);  //calculates the height from node. Algorithm borrowed from wiki.answers.com
        int compareVals(T v1, T v2);
        int compareVals(string v1, string v2);      
};

template <class T>
BinaryTree<T>::BinaryTree<T>() : size(0){}

template <class T>
bool BinaryTree<T>::isEmpty(){
    return (!size);
}

template <class T> 
int BinaryTree<T>::compareVals(T v1, T v2){
    int result;
    v1 <= v2? result = -1 : result = 1;
    return result;
}

template <class T> 
int BinaryTree<T>::compareVals(string v1, string v2){
    int result;
    result = v1.compare(v2);
    if(result >= 0)
        result = -1;
    else
        result = 1;
    return result;
}

template <class T>
int BinaryTree<T>::getSize(){
    return size;
}

template <class T>
void BinaryTree<T>::add(T key, T data){
    bool done = false;
    TreeNode * temp;

    if(keyExists(key)){
        temp = findNode(root,key);
        temp->size++;
        temp->data.push_back(key); 
    }
    else{
        temp = new TreeNode;
        temp->leftChild = 0;
        temp->rightChild = 0;
        temp->key = key;
        temp->size = 0;
        temp->data.push_back(data);        
        if(isEmpty())
            root = temp;   
        else
            sortAdd(root, temp);
       size++; 
    }
}

template <class T>
void BinaryTree<T>::sortAdd(TreeNode * eNode, TreeNode * nNode){
    if(leftOrRight(eNode, nNode) == 'L'){
        if(eNode->leftChild == 0)
            eNode->leftChild = nNode;
        else
            sortAdd(eNode->leftChild,nNode);
    } else {
        if(eNode->rightChild == 0)
            eNode->rightChild = nNode;
        else
            sortAdd(eNode->rightChild,nNode);
    }
}

template <class T>
char BinaryTree<T>::leftOrRight(TreeNode * eNode, TreeNode * nNode){
    char result;
    if(compareVals(nNode->key, eNode->key) == -1)
        result = 'L';
    else
        result = 'R';
    return result;
}

template <class T>
void BinaryTree<T>::displayAll(){
    display(root,"",true);    
}

template <class T>
void BinaryTree<T>::display(TreeNode * node, string indent, bool last){
    if(!isEmpty()){
        cout << indent;
        if(last){
            cout << "\\-";
            indent += " ";  
        } else {
            cout << "|-";
            indent += "| ";
        }
        cout << node->key << "\n";
        if(node->leftChild != 0)
            display(node->leftChild, indent, false);
        if(node->rightChild != 0)
            display(node->rightChild, indent, true); 
    } else
        cout << "TREE IS EMPTY" << "\n\n";
}

template <class T>
int BinaryTree<T>::getHeight(){
      if(!root)
        cout << "ERROR: getHeight() root is NULL!" << "\n";
      int result;
      if(isEmpty())
            result = 0;
      else
            result = calcHeight(root, 1);
      return result;
}

template <class T>
int BinaryTree<T>::getKeyHeight(T key){
    int result = -1;
    if(!keyExists(key))
        cout << "ERROR: Trying to get height of nonexistant key " << key << "\n";
    else{
        TreeNode * temp = findNode(root, key);    
        result = getHeight() - calcHeight(temp,1);
    }
    return result;
}

template <class T>
int BinaryTree<T>::calcHeight(TreeNode * node, int depth){ //Algorithm borrowed from wiki.answers.com
    int leftDepth,
        rightDepth,
        result;
    if(node->leftChild)
        leftDepth = calcHeight(node->leftChild, depth+1);
    else
        leftDepth = depth;
    if(node->rightChild)
        rightDepth = calcHeight(node->rightChild, depth+1);
    else
        rightDepth = depth;
    if(leftDepth > rightDepth)     
        result = leftDepth;
    else
        result = rightDepth;
    return result;
}

template <class T>
void BinaryTree<T>::remove(T input){
    if(!keyExists(input))
        cout << "ERR: trying to remove nonexistant key " << input << "\n";
    else{
        TreeNode * temp = findNode(root,input);
        removeNode(temp);
    }      
}

template <class T>
bool BinaryTree<T>::keyExists(T key){
    bool result;
    if(isEmpty())
        result = false;
    else{
        if(findNode(root,key) != 0)
            result = true;
        else
            result = false;
    }   
    return result;    
}


template <class T>
typename BinaryTree<T>::TreeNode * BinaryTree<T>::findNode(TreeNode * node, T input){
    TreeNode *  result = 0;     //Returns 0 if none found
    if(node->key == input)
        result = node;
    else{
        if(node->leftChild != 0)
            result = findNode(node->leftChild, input);
        if(result == 0 && node->rightChild != 0)
            result = findNode(node->rightChild, input);
    }
    return result;
}

template <class T>
void BinaryTree<T>::removeNode(TreeNode * node){
    TreeNode * parent = 0;
    if(node != root)
        parent = findParent(root,node);

    if(node->leftChild && node->rightChild){                    //Case: both children (algorithm borrowed from tech-faq.com)
        TreeNode * temp = findMin(node->rightChild);  
        string tkey = temp->key;
        removeNode(temp); 
        node->key = tkey;
    } else {
        if(parent){                                             
            if(!(node->leftChild) && !(node->rightChild)){      //case: no children & not root
                if(parent->leftChild == node)
                    parent->leftChild = 0;
                else
                    parent->rightChild = 0;    
            }    
            if(!(node->leftChild) && node->rightChild){         //case: right child only & not root
                if(parent->leftChild == node)
                    parent->leftChild = node->rightChild;
                else
                    parent->rightChild = node->rightChild;    
            }
            if(node->leftChild && !(node->rightChild)){         //case: left child only & not root
                if(parent->leftChild == node)
                    parent->leftChild = node->leftChild;
                else
                    parent->rightChild = node->leftChild;    
            }
            delete node;
            size--;
        }
        else{
            if(node->leftChild)                             //case: left child only & root
                root = node->leftChild;
            else                                           //case: right child only & root
                root = node->rightChild;
            delete node;                                   //case: no children & root intrinsically covered
            size--;    
        }
    }
}

template <class T>
typename BinaryTree<T>::TreeNode * BinaryTree<T>::findMin(TreeNode * node){
    TreeNode * result;
    if(node->leftChild == 0)
        result = node;
    else
        result = findMin(node->leftChild);
    return result;
}

template <class T>
typename BinaryTree<T>::TreeNode * BinaryTree<T>::findParent(TreeNode * start, TreeNode * child){
    TreeNode * result = 0;

    if(start->leftChild){
        if(start->leftChild->key == child->key)
            result = start;   
        else 
            result = findParent(start->leftChild, child);
    }
    if(start->rightChild && result == 0){
        if(start->rightChild->key == child->key)
            result = start;    
        else
            result = findParent(start->rightChild, child);
    }
    return result;
}

template <class T>
void BinaryTree<T>::destroySubTree(TreeNode * node){
    TreeNode * parent = 0;
    if(node != root)
        parent = findParent(root,node);
    if(node->leftChild)
        destroySubTree(node->leftChild);
    if(node->rightChild)
        destroySubTree(node->rightChild);
    if(parent){
        if(parent->leftChild == node)
            parent->leftChild = 0;
        else
            parent->rightChild = 0;
    }   
    size--;
    delete node;    
}

template <class T>
BinaryTree<T>::~BinaryTree<T>(){
    if(!isEmpty())
        destroySubTree(root);
}



#endif
share|improve this question
    
std::string supports relational operators like == and <= so you don't really need to specialise for string in this case. –  Jonathan Potter Sep 30 '13 at 1:28

1 Answer 1

up vote 1 down vote accepted

When T is std::string, you will end up having to functions with identical signature, that's why your compiler is complaining. To overcome this, just make compareVals a template of its own. I would also suggest you make them static, so that you can call them without an object.

static int compareVals(std::string const& v1, std::string const& v2)
{
    //compare std::string
}

template<typename U>
static int compareVals(U v1, U v2)
{
    //compare everything else
}

In fact, std::string does have built in relational operators, so for your specific use case it might not be necessary to define a compare function like the above. At any rate, this approach might still be useful to avoid making the assumption operators are defined for every data type your BinaryTree might end up supporting in the future.

share|improve this answer
    
Thank you very much! Two questions: 1. In order to implement two different typenames, will I have to change the typename above my header? IE template <class t, u> ? 2. Do the relational operators for string rank them alphabetically? I was told that it ranked them based on size, or something like that. –  user2779949 Sep 30 '13 at 1:48
    
@user2779949 You won't need to change the signature of the class, don't worry. As for the comparison operators, they do what you would expect, i.e. rank the strings alphabetically –  brunocodutra Sep 30 '13 at 2:03

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