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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:

5
|
6
|
7
|
8
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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
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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:

http://www.cse.yorku.ca/~aaw/Jason/FibonacciHeapAnimation.html

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

example:

  • insert 1 through 10:

start

  • extract min:

extractMin

  • decrease 7 to 0:

firstDec

  • extract min:

extractMin

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

fin

edit:

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:

insert_3_elements

  • extract min:

extractMin2

  • delete new right child (1):

deeper

all images are created by this website

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