# Implementing Dijkstra's shortest path algorithm using a red/black tree?

I know that Dijkstra's algorithm in reality is implemented using a Fibonacci heap. But can it also be implemented using a red black tree and still have a worst-case running time of O(m log n)?

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See cs.utexas.edu/users/shaikat/papers/TR-07-54.pdf for actual ways on how to implement it efficiently. –  mmgp Jan 24 '13 at 15:50
Have a look into this related question stackoverflow.com/q/14252582/194609 –  Karussell Jan 29 '13 at 7:27

For starters, it's rare to actually see Dijkstra's algorithm implemented with a Fibonacci heap. Although the Fibonacci heap gives great asymptotic performance (O(m + n log n)), in practice it has such high constant factors that other types of heaps are more efficient.

As to your question - yes, you could use a red-black tree as a priority queue to get O(m log n) performance. This works because you can find the minimum element in a red-black tree in O(log n) time and simulate a decrease-key operation on the tree in time O(log n) by doing a deletion followed by an insertion. However, this is probably not as efficient as using a standard binary heap, since the red-black tree has worse locality of reference and more memory overhead. More generally, you always can use a balanced binary search tree whenever you need a priority queue, though usually doing so is overkill.

Hope this helps!

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