Minimum cut in a graph
min_cut
calculates the minimum st-cut between two vertices in a graph
(if the source
and target
arguments are given) or the minimum
cut of the graph (if both source
and target
are NULL
).
min_cut( graph, source = NULL, target = NULL, capacity = NULL, value.only = TRUE )
graph |
The input graph. |
source |
The id of the source vertex. |
target |
The id of the target vertex (sometimes also called sink). |
capacity |
Vector giving the capacity of the edges. If this is
|
value.only |
Logical scalar, if |
The minimum st-cut between source
and target
is the minimum
total weight of edges needed to remove to eliminate all paths from
source
to target
.
The minimum cut of a graph is the minimum total weight of the edges needed to remove to separate the graph into (at least) two components. (Which is to make the graph not strongly connected in the directed case.)
The maximum flow between two vertices in a graph is the same as the minimum
st-cut, so max_flow
and min_cut
essentially calculate the same
quantity, the only difference is that min_cut
can be invoked without
giving the source
and target
arguments and then minimum of all
possible minimum cuts is calculated.
For undirected graphs the Stoer-Wagner algorithm (see reference below) is used to calculate the minimum cut.
For min_cut
a nuieric constant, the value of the minimum
cut, except if value.only = FALSE
. In this case a named list with
components:
value |
Numeric scalar, the cut value. |
cut |
Numeric vector, the edges in the cut. |
partition1 |
The vertices in the first partition after the cut edges are removed. Note that these vertices might be actually in different components (after the cut edges are removed), as the graph may fall apart into more than two components. |
partition2 |
The vertices in the second partition after the cut edges are removed. Note that these vertices might be actually in different components (after the cut edges are removed), as the graph may fall apart into more than two components. |
M. Stoer and F. Wagner: A simple min-cut algorithm, Journal of the ACM, 44 585-591, 1997.
max_flow
for the related maximum flow
problem, distances
, edge_connectivity
,
vertex_connectivity
g <- make_ring(100) min_cut(g, capacity=rep(1,vcount(g))) min_cut(g, value.only=FALSE, capacity=rep(1,vcount(g))) g2 <- graph( c(1,2,2,3,3,4, 1,6,6,5,5,4, 4,1) ) E(g2)$capacity <- c(3,1,2, 10,1,3, 2) min_cut(g2, value.only=FALSE)
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