A subgraph of a connected graph is a minimum spanning tree if it is tree, and the sum of its edge weights are the minimal among all tree subgraphs of the graph. A minimum spanning forest of a graph is the graph consisting of the minimum spanning trees of its components.
mst(graph, weights = NULL, algorithm = NULL, ...)
The graph object to analyze.
Numeric algorithm giving the weights of the edges in the
graph. The order is determined by the edge ids. This is ignored if the
unweighted
algorithm is chosen. Edge weights are interpreted as
distances.
The algorithm to use for calculation. unweighted
can
be used for unweighted graphs, and prim
runs Prim's algorithm for
weighted graphs. If this is NULL
then igraph tries to select the
algorithm automatically: if the graph has an edge attribute called
weight
or the weights
argument is not NULL
then Prim's
algorithm is chosen, otherwise the unweighted algorithm is performed.
Additional arguments, unused.
A graph object with the minimum spanning forest. (To check that it
is a tree check that the number of its edges is vcount(graph)-1
.)
The edge and vertex attributes of the original graph are preserved in the
result.
If the graph is unconnected a minimum spanning forest is returned.
Prim, R.C. 1957. Shortest connection networks and some generalizations Bell System Technical Journal, 37 1389--1401.
# NOT RUN {
g <- sample_gnp(100, 3/100)
g_mst <- mst(g)
# }
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