# How can I implement a purely functional standard binary heap (ocaml or haskell)?

Are there any implementations of a purely functional standard binary heap? I know there are lots of interesting heaps eg: Binomial, leftist heap, they all have functional implementation, just wonder is there a way to implement standard binary heap or we have to use Array to implement it, because of the immutable type ? Thanks!

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This isn't really much of a question. You should probably reword it as something like "How can I implement a purely functional binary heap?"--you're much more likely to get useful, insightful answers with this formulation. –  Tikhon Jelvis Jan 2 '12 at 1:58
@TikhonJelvis thanks –  Ang Jan 2 '12 at 2:23
That depends. Do you expect the purely functional version to use the same kind of structure for the data? Behave the same way for certain operations? If these things are allowed to be different, then can it really be called a "binary heap"? –  Dan Burton Jan 2 '12 at 2:32
There is a great book by Chris Okasaki named `Purely Functional Data Structures`. Might be worth a look! –  Magnus Kronqvist Jan 3 '12 at 6:18
I would also suggest that if you need a priority queue, to use a self-balancing binary search tree. They are already built in to the standard libraries as `Set` and `Map` in OCaml and Haskell. They have the same asymptotic complexity for adding, removing, as binary heaps. –  newacct Dec 18 '13 at 22:08

You don't need an array to implement a heap, you can implement it as a tree structure.

``````data Heap t = Node t (Heap t) (Heap t) | Nil
``````

The drawback is that you end up reallocating `O(log N)` of the nodes for every heap operation, and you won't have any of the cache locality of an imperative array-based implementation. Some operations will be difficult with this structure, but since I don't know what you want to do with the heap I can't point you in a more specific direction.

The reason we have special functional structures like finger trees is to speed up specific operations that you don't normally perform on heaps, like retrieving the leftmost leaf node. You can use many of the same data structures you learned for imperative languages in Haskell with only changes to the ways they are updated.

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Thanks Dietrich, the operation I want to implement is push down a random new value from the root, just not sure which is the best way to implement this operation in a functional style. –  Ang Jan 2 '12 at 2:46

Shameless plug: Braun trees are perfect candidates for a purely functional min-heap (or priority queue).

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You can look through the ideas described in this paper A Functional Approach to Standard Binary Heaps or in this source Heap.scala.

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