Difference between revisions of "Girvan et al PNAS 2002"
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== Study plan == | == Study plan == | ||
− | This paper is quite clear and self-explanatory thus require very little background in order to understand it. Some of the common properties in the [Girvan et al PNAS 2002 | background section] would be useful. | + | This paper is quite clear and self-explanatory thus require very little background in order to understand it. Some of the common properties in the [[Girvan et al PNAS 2002#Background | background section]] would be useful. |
Just in case you are not familiar with graph: | Just in case you are not familiar with graph: | ||
*[http://en.wikipedia.org/wiki/Graph_theory graph theory] | *[http://en.wikipedia.org/wiki/Graph_theory graph theory] |
Revision as of 03:55, 27 September 2012
Contents
Citation
Girvan, M. & Newman, M. E. J. Community structure in social and biological networks. Proc. Natl. Acad. Sci. USA 99, 7821-7826 (2002).
Online Version
Summary
This paper shows a method for detecting community structure in a network which addresses the topic of Community Detection. The method is designed with the setting that network nodes are joined together in tightly-knit groups between which there are only looser connections.
The key idea is to construct the communities by removing edges from the original graph, contrasting to the traditional way which constructs the communities by add edges to the vertex set. The edges to be removed is chosen based on the edge betweenness - the number of shortest paths between pairs of vertices that run along the edge.
If a network contains communities or groups that are only loosely connected by a few inter-group edges, then all shortest paths between different communities must go along one of these few edges. Thus, the edges connecting communities will have high edge betweenness. By removing these edges, the method separates groups from one another and so reveal the underlying community structure of the graph.
Brief description of the method
- Calculate the betweenness for all edges in the network.
- Remove the edge with the highest betweenness.
- Recalculate betweennesses for all edges affected by the removal.
- Repeat from step 2 until no edges remain.
Step one uses the fast algorithm to calculate the betweenness from Newman's paper. The result is not well if the method omits the third step because if two communities are connected by more than two edges, the method can only guarantee one with high betweenness. By recalculating every time, the method can ensure that at least one of the remaining edges between two communities will have a high value.
The time complexity of this algorithm is where is the number of edges and is the number of nodes. This is because the each betweenness calculation time complexity is .
Experiment result
The test result is quite promising. It was verified on three known-community graphs and explored two unknown-community graphs. Both return high accuracy results.
- computer-generated graph. If out of 16 edges of each vertex, six or less edges are inter-community edges, then the accuracy is pretty high: 100% accuracy of classifying the vertex to the community.
- Zachary's karate network Out of 34 nodes, only one node is classified incorrectly.
- football networks Almost all teams are correctly grouped with the other teams in their conference. Few cases in which the algorithm seems to fail actually correspond to nuances in the scheduling of games.
- scientific collaboration network The algorithm seems to find two types of communities: scientists grouped together by similarity either of research topic or of methodology.
- food web The algorithm finds out two well-defined communities of roughly equal size,plus a small number of vertices that belong to neither community. The split between the two large communities corresponds quite closely with the division between pelagic organisms and benthic organisms.
Background
Some common properties of many networks
- Small-word property - average distance between vertices in a network is short
- power-law degree distributions - many vertices in a network with low degree and a small number with high degree
- network transitivity - two vertices having a same neighbor would have higher probability of being neighbors of each other.
A traditional method of constructing the communities
- Calculate the weight for each pair of vertices.
- Beginning from an vertex only set, add edges between pairs one by one in the desc order of the weights.
- The resulting graph shows a nested set of increasingly large components, which are taken to be the communities.
Related papers
- Zhou, Phy. Rev Phys. Rev. E 67, 041908 (2003)
- M. E. J. Newman, The structure of scientic collaboration networks. Proc. Natl. Acad. Sci. USA 98, 404-409(2001)
- M. E. J. Newman, Scientfic collaboration networks: II.Shortest paths, weighted networks, and centrality. Phys. Rev. E 64, 016132 (2001)
Study plan
This paper is quite clear and self-explanatory thus require very little background in order to understand it. Some of the common properties in the background section would be useful.
Just in case you are not familiar with graph: