% Generated by roxygen2 (4.1.1): do not edit by hand
% Please edit documentation in R/topology.R
\name{count_subgraph_isomorphisms}
\alias{count_subgraph_isomorphisms}
\alias{graph.count.subisomorphisms.vf2}
\title{Count the isomorphic mappings between a graph and the subgraphs of
another graph}
\usage{
count_subgraph_isomorphisms(pattern, target, method = c("lad", "vf2"), ...)
}
\arguments{
\item{pattern}{The smaller graph, it might be directed or
undirected. Undirected graphs are treated as directed graphs with
mutual edges.}

\item{target}{The bigger graph, it might be directed or
undirected. Undirected graphs are treated as directed graphs with
mutual edges.}

\item{method}{The method to use. Possible values:
\sQuote{lad}, \sQuote{vf2}. See their details below.}

\item{...}{Additional arguments, passed to the various methods.}
}
\value{
Logical scalar, \code{TRUE} if the \code{pattern} is
  isomorphic to a (possibly induced) subgraph of \code{target}.
}
\description{
Count the isomorphic mappings between a graph and the subgraphs of
another graph
}
\section{\sQuote{lad} method}{

This is the LAD algorithm by Solnon, see the reference below. It has
the following extra arguments:
\describe{
  \item{domains}{If not \code{NULL}, then it specifies matching
    restrictions. It must be a list of \code{target} vertex sets, given
    as numeric vertex ids or symbolic vertex names. The length of the
    list must be \code{vcount(pattern)} and for each vertex in
    \code{pattern} it gives the allowed matching vertices in
    \code{target}. Defaults to \code{NULL}.}
  \item{induced}{Logical scalar, whether to search for an induced
    subgraph. It is \code{FALSE} by default.}
  \item{time.limit}{The processor time limit for the computation, in
    seconds. It defaults to \code{Inf}, which means no limit.}
}
}

\section{\sQuote{vf2} method}{

This method uses the VF2 algorithm by Cordella, Foggia et al., see
references below. It supports vertex and edge colors and have the
following extra arguments:
\describe{
  \item{vertex.color1, vertex.color2}{Optional integer vectors giving the
    colors of the vertices for colored graph isomorphism. If they
    are not given, but the graph has a \dQuote{color} vertex attribute,
    then it will be used. If you want to ignore these attributes, then
    supply \code{NULL} for both of these arguments. See also examples
    below.}
  \item{edge.color1, edge.color2}{Optional integer vectors giving the
    colors of the edges for edge-colored (sub)graph isomorphism. If they
    are not given, but the graph has a \dQuote{color} edge attribute,
    then it will be used. If you want to ignore these attributes, then
    supply \code{NULL} for both of these arguments.}
}
}
\references{
LP Cordella,  P Foggia, C Sansone, and M Vento: An improved algorithm
 for matching large graphs, \emph{Proc. of the 3rd IAPR TC-15 Workshop
 on Graphbased Representations in Pattern Recognition}, 149--159, 2001.

 C. Solnon: AllDifferent-based Filtering for Subgraph Isomorphism,
 \emph{Artificial Intelligence} 174(12-13):850--864, 2010.
}
\seealso{
Other graph isomorphism: \code{\link{count_isomorphisms}},
  \code{\link{graph.count.isomorphisms.vf2}};
  \code{\link{graph.get.isomorphisms.vf2}},
  \code{\link{isomorphisms}};
  \code{\link{graph.get.subisomorphisms.vf2}},
  \code{\link{subgraph_isomorphisms}};
  \code{\link{graph.isoclass}},
  \code{\link{graph.isoclass.subgraph}},
  \code{\link{isomorphism_class}};
  \code{\link{graph.isocreate}},
  \code{\link{graph_from_isomorphism_class}};
  \code{\link{graph.isomorphic}},
  \code{\link{graph.isomorphic.34}},
  \code{\link{graph.isomorphic.bliss}},
  \code{\link{graph.isomorphic.vf2}},
  \code{\link{is_isomorphic_to}}, \code{\link{isomorphic}};
  \code{\link{graph.subisomorphic.lad}},
  \code{\link{graph.subisomorphic.vf2}},
  \code{\link{is_subgraph_isomorphic_to}},
  \code{\link{subgraph_isomorphic}}
}