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What is the time complexity of inorder,postorder and preorder traversal of binary trees in data structures?? Is it O(n) or O(log n) or O(n^2)??

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Which data structures? Trees? What type of trees? –  Yuval F Dec 28 '10 at 15:11
This question belongs to cstheory.stackexchange.com –  Matěj Zábský Dec 28 '10 at 15:15
@CommanderZ - let's not start splitting hairs. –  Vilx- Dec 28 '10 at 15:16

3 Answers 3

O(n) I would believe, because you traverse each node once. Or rather - the amount of work you do for each node is constant (does not depend on the rest of the nodes).

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ohh , you already posted the same answer , deleting my own –  TalentTuner Dec 28 '10 at 15:14

Travesal is O(n) for any order - because you are hitting each node once. Lookup is where it can be less than O(n) IF the tree has some sort of organizing schema (ie binary search tree).

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O(n),I would say . I am doing for a balanced tree,applicable for all the trees. Assuming that you use recursion,

T(n) = 2*T(n/2) + 1 ----------> (1)

T(n/2) for left sub-tree and T(n/2) for right sub-tree and '1' for verifying the base case.

On Simplifying (1) you can prove that the traversal(either inorder or preorder or post order) is of order O(n).

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