Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

What sequence of operations would give the worst case for fibonacci heaps? Where each node has only one child except for the last node?

For example:

share|improve this question
This is actually the best case for a heap. –  jpalecek Nov 12 '11 at 17:51

2 Answers 2

up vote -1 down vote accepted

This is actually the best case (as you can see, extract-min is always easy, since we have the element ordered). You should get it by inserting a sequence of reverse-sorted elements (that is, the minimal element would come last) in this manner:

  1. insert two elements
  2. extract-min
  3. repeat
share|improve this answer
I think this produces a single tree but it's not as requested (each node should have only one child). Check out here: cse.yorku.ca/~aaw/Jason/FibonacciHeapAnimation.html –  Alaa M. Jul 31 '14 at 21:39

I think jpalecek's answer doesn't produce the requested tree. Try it here:


Also, You can achieve the same result just by inserting whatever number of elements and then extract-min once. Anyway, that's not the request.

To achieve the form you wanted do this:

  • insert whatever number of elements - say 1 through 10.
  • extract min (now you have a single tree)
  • decrease all children to -inf except the leftmost, starting from the deepest, and from left to right (see demonstration below).
  • after each decrease, delete the min
  • repeat step 3


  • insert 1 through 10:


  • extract min:


  • decrease 7 to 0:


  • extract min:


  • decrease 5 to 0, extract min , decrease 4 to 0, extract min , decrease 3 to 0, extract min , decrease 10 to 0, extract min:



I forgot there's a delete operation that makes decrease then extract min, so you can use it instead of the decrease then extract min i was doing above.

And note that now when you have a "single path" tree, you can easily keep enlarging it by this sequence of O(1) operations:

  • insert 3 elements smaller than the min
  • extract min
  • delete the new right child

demonstration (continuing last step from the example):

  • insert 1,0,-1:


  • extract min:


  • delete new right child (1):


all images are created by this website

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.