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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
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

4 Answers 4

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

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).


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

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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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