These functions find all, the largest or all the maximal cliques in an undirected graph. The size of the largest clique can also be calculated.
cliques(graph, min = NULL, max = NULL)max_cliques(graph, min = NULL, max = NULL, subset = NULL, file = NULL)
The input graph, directed graphs will be considered as undirected ones, multiple edges and loops are ignored.
Numeric constant, lower limit on the size of the cliques to find.
NULL means no limit, ie. it is the same as 0.
Numeric constant, upper limit on the size of the cliques to find.
NULL means no limit.
If not NULL, then it must be a vector of vertex ids,
numeric or symbolic if the graph is named. The algorithm is run from these
vertices only, so only a subset of all maximal cliques is returned. See the
Eppstein paper for details. This argument makes it possible to easily
parallelize the finding of maximal cliques.
If not NULL, then it must be a file name, i.e. a
character scalar. The output of the algorithm is written to this file. (If
it exists, then it will be overwritten.) Each clique will be a separate line
in the file, given with the numeric ids of its vertices, separated by
whitespace.
cliques, largest_cliques and clique_num
return a list containing numeric vectors of vertex ids. Each list element is
a clique, i.e. a vertex sequence of class igraph.vs.
max_cliques returns NULL, invisibly, if its file
argument is not NULL. The output is written to the specified file in
this case.
clique_num and count_max_cliques return an integer
scalar.
cliques find all complete subgraphs in the input graph, obeying the
size limitations given in the min and max arguments.
largest_cliques finds all largest cliques in the input graph. A
clique is largest if there is no other clique including more vertices.
max_cliques finds all maximal cliques in the input graph. A
clique in maximal if it cannot be extended to a larger clique. The largest
cliques are always maximal, but a maximal clique is not necessarily the
largest.
count_max_cliques counts the maximal cliques.
clique_num calculates the size of the largest clique(s).
The current implementation of these functions searches for maximal
independent vertex sets (see ivs) in the
complementer graph.
For maximal cliques the following algorithm is implemented: David Eppstein, Maarten Loffler, Darren Strash: Listing All Maximal Cliques in Sparse Graphs in Near-optimal Time. https://arxiv.org/abs/1006.5440
# NOT RUN {
# this usually contains cliques of size six
g <- sample_gnp(100, 0.3)
clique_num(g)
cliques(g, min=6)
largest_cliques(g)
# To have a bit less maximal cliques, about 100-200 usually
g <- sample_gnp(100, 0.03)
max_cliques(g)
# }
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