I can write both Prim's and Kruskal's algorithms to find a minimum spanning tree in C++ or Java, but I want to know how to implement them in Haskell with O(mlogm) or O(mlogn) (pure functional programs is better). Thanks a lot.
As svenningsson suggests, priority search queue is well suited for both Kruskal's and Prim's (atleast the author proclaims it in his paper.) The problem with Kruskal is that it requires that you have an O(log n) union-find algorithm. A union-find datastructure with a purely functional interface is described here, but it uses mutable state internally, and a purely functional implementation might be impossible and in fact, there are several problems where an efficient purely functional solution is not known, as discussed in this related SO question.
A non-pure alterenative is to implement union-find algorithm in the ST monad. A search on Hackage finds that the equivalence package suits our needs. Following is an implementation of Kruskal using Data.Equivalence.Monad from the equivalence package:
It can be used like this:
and running test gives:
It should be noted that the running time is dependent on weights running in O(1) time, however
I think a priority search queue is what you're looking for. It can be implemented optimally in a functional language as demonstrated by Ralf Hinze in a paper. It seems like the paper is only available via acm's library at a cost.
Here is a crude Kruskal implementation.
The first step is sorting the edges, which is O(n log n). The problem is to find a faster lookup for the vertex sets in the extract function. I couldn't find a faster solution for this, maybe someone has an idea...
For a Scala implementation I used a map-like data-structure for (hopefully) better performance, but unfortunately it uses mutable sets, and I have no clue how to translate this into Haskell. The code is in my blog (sorry, description is in German): http://dgronau.wordpress.com/2010/11/28/nochmal-kruskal/