Sign up ×
Stack Overflow is a community of 4.7 million programmers, just like you, helping each other. Join them, it only takes a minute:

I would like to test if two given BSTs (Binary Search Trees) are equal in Java. The BST nodes do not have pointers to the parent nodes.

The simplest solution is to traverse both BSTs, create two traversal lists and test if the lists are equal. However it requires O(N) memory.

I would like to try another way: create an Iterator, which traverses the BSTs, and ... the rest is obvious.

Does it make sense? Is there any "better" (simpler and efficient) solution to test if two BSTs are equal?

share|improve this question
How do you define equal BST? –  nhahtdh Jul 16 '12 at 7:07

3 Answers 3

up vote 1 down vote accepted

Implement a recursive equals() method. It would require no memory, and would be easy to code.

Something like this should work:

public class Node {

    Object value;
    private Node left;
    private Node right;

    public boolean equals(Object o) {
        if (o instanceof Node) {
            Node node = (Node)o;
            if (value.equals(node.value)) {
                return true;
            return ((left == null && node.left == null) || left.equals( node.left)) && 
                    ((right == null && node.right == null) || right.equals( node.right));
        return false;

Note that you should override hashCode() to reflect this implementation, so consider naming the above impl as equalsDeep() instead and skipping the hashCode() impl.

share|improve this answer
Recursive solution does require non-constant memory (the stack). –  Michael Jul 16 '12 at 7:08
Yeah, but no heap, which I think was what the OP meant. Unless the tree is very deep (1000's of levels), this impl will be OK –  Bohemian Jul 16 '12 at 7:14
  1. Binary search tree is a tree, right?

  2. Two trees are equal if they have the same root and the same children.

  3. Each child is also a tree.

  4. See point 2.

Hint: . The memory consumption is O(logn) (prove it yourself).

share|improve this answer
Thanks, great. What if want a non-recursive solution ? –  Michael Jul 16 '12 at 7:08
@Michael: You can turn recursive solution into non-recursive solution with an explicit stack. –  nhahtdh Jul 16 '12 at 7:23
@nhahtdh That's correct. Will it be different from the solution with Iterators I mentioned in the original question? –  Michael Jul 16 '12 at 7:34
@Michael: Assuming balanced BST, then it will use O(log n) memory (otherwise, the memory can go up to O(n) for a skewed tree). Tomasz's method consider 2 BST equals if they have the same structure and data. If you use Iterator, if you mix and match BST with (doubly?) linked list, you can just use the Iterator O(1) space and compare 2 BST (by structure + data or by data only are both possible) –  nhahtdh Jul 16 '12 at 7:48
@Michael: it will. The maximum depth of this stack will be log(n) - you'll never store all nodes in one list. It's a difference between BFS and DFS traversal. –  Tomasz Nurkiewicz Jul 16 '12 at 7:49

The easiest way could be, create a hash of both tree and then check whether they are equal or not. This only apply if the content of both tree are same as well.

How to create checksum and then compare those checksum.

share|improve this answer
Hash (in Java terms) is not guaranteed to be different for two different objects. Hash (in crypthographic terms) is a bit far fetched, IMHO. –  Tomasz Nurkiewicz Jul 16 '12 at 7:05
Ohhh okay, learnt something new. I will delete this answer soon. But it's an option at-least if you are comparing two hash of lets say a String object. Am I right? –  doNotCheckMyBlog Jul 16 '12 at 7:07
@Owl I think Tomasz is referring to object.hashCode() - if you in fact mean some kind of checksum (MD5, SHA1, etc) then I think you'd be fine. –  Robert Trickey Jul 16 '12 at 7:13
Ofcourse I mean by checksum hash –  doNotCheckMyBlog Jul 16 '12 at 7:28

Your Answer


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.