# Time complexity to find 7th smallest element in a min heap?

I am interested in finding 7th smallest element in a min heap, if we assume that min heap contains duplicates ?

I don't know how to approach. Can anyone provide an idea ?

• In case you are interested in the theorey behind this problem, there is an O(k) algorithm to select the k-th smallest element: sciencedirect.com/science/article/pii/S0890540183710308 So it can be done in O(1) – Niklas B. Oct 13 '16 at 19:30
• @NiklasB. I know that, but what if duplicates are there ? – Garrick Oct 13 '16 at 19:32
• Doesn't make a difference. The algorithm described in that paper only assumes a partial order. Not saying it is practical in any way though – Niklas B. Oct 13 '16 at 19:41
• Do you want the seventh smallest element, or the seventh smallest value? IOW, if the values in the heap were [1,1,1,2,3,4,5,6,7,8...], would you want the seventh element (`5`), or the seventh unique value (`7`)? If it is the latter, then the algorithm @NiklasB. refers to won't work, but your question as written is misleading. – rici Oct 13 '16 at 20:43
• In addition to @rici's comment, if you want the seventh unique value, it seems like you can get no better than linear time – Niklas B. Oct 13 '16 at 20:59

## 2 Answers

As the seventh smallest element is in the top 7 levels of the min-heap, it is the 7th smallest of the 127 elements in the top 7 levels. Since this number is fixed (independent of the size of the original heap), the complexity is O(1).

• (or the 6th smallest of the 126 elements in the second through the seventh level, since the first element is always the smallest.) – rici Oct 13 '16 at 20:37
• @deinst, check this please, quiz.geeksforgeeks.org/data-structures-heap-question-8 . It says "If Min-Heap is allowed to have duplicates, then time complexity becomes Θ(Log n)" ?? – Garrick Oct 14 '16 at 2:57
• @deinst, Check this please quiz.geeksforgeeks.org/data-structures-heap-question-8 . It says "If Min-Heap is allowed to have duplicates, then time complexity becomes Θ(Log n)" ?? – Garrick Oct 14 '16 at 3:05
• @Willturner, This is a difference between element and value. I have trouble seeing an O(log n) solution for finding the seventh smallest value. The seventh smallest element could end up on the bottom level, and you'd have to look through O(n) things to find it. – deinst Oct 14 '16 at 4:24

There's a simple O(k*log k) algorithm to select the k'th smallest element from a heap:

``````# h = input heap
q = new min-heap()
q.insert(h.root)
for i := 1 to k - 1
top = q.delete-min()
q.insert(top.left)
q.insert(top.right)
report q.top
``````

Of course this is constant time for the case k = 7. If you want the k-th smallest distinct element, rather than the k-th smallest overall, you will need linear time, because all elements in the heap could be equal except for the leaves, and then you need to find the (k-1)st smallest leaf, which is not possible in o(n) if all inner nodes have the same value.