# Which Minimum Spanning tree algorithm to use in which situation

I am newbie to Minimum spanning trees and trying to figure out which MST algorithm to use in any particular situation. Can anybody provide some examples with any particular situation where one of the MST algorithm is more suitable than others

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What algorithms do you consider? Those listed on Wikipedia? Borůvka and Kruskal only? –  Jan Dvorak Jan 3 '13 at 16:17
Prim's,Kruskal only –  anuj pradhan Jan 3 '13 at 16:21

Check out this pdf

Quick Summery (quoting the page):

"Boruvka’s and Kruskal’s algorithms are clearly more useful if applied to the real world, while Prim’s runtime grows far too quickly with the order of the graph to be of use in a serial processing environment."

"Out of the three algorithms, Boruvka’s holds most promise when parallel computing is considered. It is parallelizable by design and involves searching locally for the smallest edge and then combining the resulting trees after each step. Division of tasks between multiple computer processing nodes would be the logical extension of Boruvka’s algorithm. However, as can be seen from this paper, Kruskal’s algorithm is much more efficient in a serial environment."

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Kruskal and Prim have same complexity. I would challenge the first statement you give here. –  Ivaylo Strandjev Jan 3 '13 at 16:23
To be honest, I don't know enough about MST to argue this. I merely found the article and wanted to share. –  Daniel Jan 3 '13 at 16:25
@izomorphius The big-oh notation neglects constants. It doesn't matter an algorithm starts wiinning at 10k nodes if you'll ever get to 800 nodes at most. –  Jan Dvorak Jan 3 '13 at 16:28
@JanDvorak surely. However I have compared both algorithms numerous times and believe that if you implement them well they do not differ significantly. –  Ivaylo Strandjev Jan 3 '13 at 16:29
One more situation pls consider this also....Dijakstra's algo which works for single source shortest path is also creating one MST out of many MST's ...this can be used also to find MST's –  anuj pradhan Jan 3 '13 at 16:32

I would say the two main solutions to the minimum spanning tree problem differ in the way the graph is represented. While Kruskal works well with edge list, Prim's algorithm will better work with a neighbourhood list. If I am left to decide on the graph representation I prefer to implement Kruskal as I find it easier to implement, but the difference is really small in that aspect- so it's up to you.

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First of all thanks for replying....and i m just trying to figure out one example when kruskal is better than prim's or vice-versa.. –  anuj pradhan Jan 3 '13 at 16:23
@anujpradhan if you already have the graph stored in an neighbourhood list or in edge list you should prefer Prim or Kruskal respectively. –  Ivaylo Strandjev Jan 3 '13 at 16:24
@izmorphius suppose i am given a graph and not any other info then we can't suppose to have a sorted list of edges,neighbours...then which? –  anuj pradhan Jan 3 '13 at 16:28
I use Kruskal because I implement it faster, but probably people that will tell you to choose Prim. –  Ivaylo Strandjev Jan 3 '13 at 16:57