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Given a Binary tree with -ve and +ve value's. print all path's froom root to any node with max sum.do it in O(n). only one traversal of tree.

Efforts :) 1) http://www.geeksforgeeks.org/find-the-maximum-sum-path-in-a-binary-tree/ is entirely different problem .

2) O(n) + O(n) is not accepted .

my approach .


i) find max sum possible . ii) traverse preorder keeping current path and sum . if(curr_sum == max_sum) print path.

2) i) find max sum possible . ii) traverse preorder keeping current path and sum . if(curr_sum == max_sum) print path. also save address of this node in a node array Arr. next time when curr_sum==max_sum just check in Arr[] if path is already printed

problem : this will print some paths multiple time's . more over interviewer wanted one traversal . this takes 2. one to find max sum . other to print paths.

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O(n) + O(n) = O(n) , just so you know. If you'd like I can easily prove it. –  Benjamin Gruenbaum Jan 19 '13 at 9:38
sir i know that well :) . so i clarified it with interviewer. he was very clear traverse tree only once . –  user1992592 Jan 19 '13 at 9:42

1 Answer 1

Do a Depth-First-Search on the tree, computing sums for all sub-paths and store them in a sorted array of lists containing sub-paths of equal length. It's easy to see that this can be done in O(n), traversing the graph exactly once.

The result is an array a where a[i] contains a list of paths of length i. Keep record of the largest index j and eventually print all paths in the list a[j].

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sir can u be bit more clear ? –  user1992592 Jan 19 '13 at 10:32
@user1992592: can you be a bit more clear? What part is it that you don't understand? –  Philip Jan 19 '13 at 12:05
Let's say we are traversing tree preorder . at any node we can't be sure that it's max path till here since child node's can be +ve or negative . so we need one traversal to get max_sum. –  user1992592 Jan 19 '13 at 12:13
also i don't get how you are saving all paths ?. how is this better then my (2) solution ? –  user1992592 Jan 19 '13 at 12:23
what about solution here : <careercup.com/question?id=15203723>; –  user1992592 Jan 19 '13 at 14:11

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