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What is the difference between a heap and BST?

When to use a heap and when to use a BST?

If you want to get the elements in a sorted fashion, is BST better over heap?

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@Chris I cannot googled and have answer like you say !!! –  hqt May 16 '12 at 4:11
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This question appears to be off-topic because it is about computer science and should be asked on cs.stackexchange.com –  Flow Sep 13 '13 at 23:13

5 Answers 5

Heap just guarantees that elements on higher levels are greater (for max-heap) or smaller (for min-heap) than elements on lower levels, whereas BST guarantees order (from "left" to "right"). If you want sorted elements, go with BST.

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When to use a heap and when to use a BST

Heap is better at findMin/findMax (O(1)), while BST is good at all finds (O(logN)). Insert is O(logN) for both structures. If you only care about findMin/findMax (e.g. priority-related), go with heap. If you want everything sorted, go with BST.

First few slides from here explain things very clearly.

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While insert is logarithmic for both in the worst case, the average heap insert takes constant time. (Since most of the existing elements are on the bottom, in most cases a new element will only have to bubble up one or two levels, if at all.) –  johncip Apr 27 at 9:33
    
@xysun I think BST is better in findMin & findMax stackoverflow.com/a/27074221/764592 –  Yeo Nov 22 at 5:02

A binary search tree uses the definition: that for every node,the node to the left of it has a less value(key) and the node to the right of it has a greater value(key).

Where as the heap,being an implementation of a binary tree uses the following definition:

If A and B are nodes, where B is the child node of A,then the value(key) of A must be larger than or equal to the value(key) of B.That is, key(A) ≥ key(B).

http://wiki.answers.com/Q/Difference_between_binary_search_tree_and_heap_tree

I ran in the same question today for my exam and I got it right. smile ... :)

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As mentioned by others, Heap can do findMin or findMax in O(1) but not both in the same data structure. However I disagree that Heap is better in findMin/findMax. In fact, with a slight modification, the BST can do both findMin and findMax in O(1).

In this modified BST, you keep track of the the min node and max node everytime you do an operation that can potentially modify the data structure. For example in insert operation you can check if the min value is larger than the newly inserted value, then assign the min value to the newly added node. The same technique can be applied on the max value. Hence, this BST contain these information which you can retrieve them in O(1). (same as binary heap)

In this BST (Balanced BST), when you pop min or pop max, the next min value to be assigned is the successor of the min node, whereas the next max value to be assigned is the predecessor of the max node. Thus it perform in O(1). However we need to re-balance the tree, thus it will still run O(log n). (same as binary heap)

I would be interested to hear your thought in the comment below. Thanks :)

Update

Cross reference to similar question Can we use binary search tree to simulate heap operation? for more discussion on simulating Heap using BST.

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Why do you disagree? would you mind share to your thought below? –  Yeo Nov 22 at 5:20
    
You could certainly store the maximum and/or minimum value of a BST, but then what happens if you want to pop it? You have to search the tree to remove it, then search again for the new max/min, both of which are O(log n) operations. That's the same order as insertions and removals in a priority heap, with a worse constant. –  Justin Lardinois Nov 22 at 5:22
    
@JustinLardinois Sorry, I forget to highlight this in my answer. In BST, when you do pop min, the next min value to be assigned is the successor of the min node. and if you pop the max, the next max value to be assigned is the predecessor of the max node. Thus it still perform in O(1). –  Yeo Nov 22 at 5:26
    
I stand corrected. –  Justin Lardinois Nov 22 at 5:45
    
Correction: for popMin or popMax it is not O(1), but it is O(log n) because it has to be a Balanced BST which need to be rebalance every delete operation. Hence it the same as binary heap popMin or popMax which run O(log n) –  Yeo Nov 22 at 7:33

Insert all n elements from an array to BST takes O(n logn). n elemnts in an array can be inserted to a heap in O(n) time. Which gives heap a definite advantage

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