Does the opposite of Kruskal's algorithm for minimum spanning tree work for it? I mean, choosing the max weight (edge) every step?
Any other idea to find maximum spanning tree?
Yes, it does.
One method for computing the maximum weight spanning tree of a network G – due to Kruskal – can be summarized as follows. Sort the edges of G into decreasing order by weight. Let T be the set of edges comprising the maximum weight spanning tree. Set T = ?. Add the first edge to T. Add the next edge to T if and only if it does not form a cycle in T. If there are no remaining edges exit and report G to be disconnected. If T has n?1 edges (where n is the number of vertices in G) stop and output T . Otherwise go to step 3.
One method for computing the maximum weight spanning tree of a network G – due to Kruskal – can be summarized as follows.
Source: https://web.archive.org/web/20141114045919/http://www.stats.ox.ac.uk/~konis/Rcourse/exercise1.pdf.
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