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 ?
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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 ?
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).
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.
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