\name{biConnComp} \alias{biConnComp} \alias{articulationPoints} \title{Compute biconnected components for a graph} \description{Compute biconnected components for a graph} \usage{ biConnComp(g) articulationPoints(g) } \arguments{ \item{g}{an instance of the \code{graph} class} } \details{ A biconnected graph is a connected graph that remains connected when any one of its vertices, and all the edges incident on this vertex, is removed and the graph remains connected. A biconnected component of a graph is a subgraph which is biconnected. An integer label is assigned to each edge to indicate which biconnected component it's in. A vertex in a graph is called an articulation point if removing it increases the number of connected components. See the documentation for the Boost Graph Library for more details. } \value{ For \code{biConnComp}: a vector whose length is no. of biconnected components, each entry is a list of nodes that are on the same biconnected components. For \code{articulationPoints}: a vector of articulation points in the graph. } \references{ Boost Graph Library ( www.boost.org/libs/graph/doc/index.html ) The Boost Graph Library: User Guide and Reference Manual; by Jeremy G. Siek, Lie-Quan Lee, and Andrew Lumsdaine; (Addison-Wesley, Pearson Education Inc., 2002), xxiv+321pp. ISBN 0-201-72914-8 } \author{Li Long